Amarts and Set Function Processes

Lecture Notes in Mathematics Edited by A. Dold and B. Eckmann

1042 Allan Gut Klaus D. Schmidt

Amarts and Set Function Processes

Springer-Verlag Berlin Heidelberg New York Tokyo 1983

Authors Allan Gut Department of Mathematics, University of Uppsala Thunbergsv~.gen 3, 75238 Uppsala, Sweden Klaus D. Schmidt Seminar f(~r Statistik, Universit~t Mannheim, A 5 6800 Mannheim, Federal Republic of Germany

AMS Subject Classifications (1980): 6 0 G 4 8 ; 6 0 G 4 0 , 6 0 G 4 2 ISBN 3-540-12867-0 Springer-Verlag Berlin Heidelberg New York Tokyo ISBN 0-387-12867-0 Springer-Verlag New York Heidelberg Berlin Tokyo This work is subject to copyright.All rights are reserved,whetherthe whole or partof the material is concerned, specificallythose of translation,reprinting, re-useof illustrations,broadcasting, reproduction by photocopying machineor similar means,and storage in data banks. Under § 54 of the German Copyright Law where copies are made for other than private use, a fee is payableto "VerwertungsgesellschaftWort~, Munich. © by Springer-VerlagBerlin Heidelberg 1983 Printed in Germany Printing and binding: Beltz Offsetdruck, Hemsbach/Bergstr. 214613140-543210

Ama

r t s

set

F u n c t i o n

Allan An

and

Gut:

introduction

asymptotic

Klaus Amarts

Allan Amarts

P r o c e s s e s

D.

to

theor~

of

....................

Schmidt:

- a measure

Gut

the

martingales

and

Klaus

theoretic

D.

- a bibliography

approach

51

Schmidt: ...................

237

AN INTRODUCTION TO THE THEORY OF

ASYHPTOTICHARTINC~ES

By Allan Gut

Contents

page

Preface

4

Introduction

5

I. History

9

2. Basic properties

14

3. Convergence

23

4. Some examples

31

5. Stability

35

6. The Riesz decomposition

40

7. Two further generalizations of martingales

44

References

46

Preface The material of these notes is based on a series of lectures on real-valued asymptotic martingales

(amarts) held at the Department of

Mathematics at Uppsala University in spring 1979. The purpose of the lectures (and now also of these notes) was (is) to introduce an audience~ familiar to martingale theory~ to the theory of asymptotic martingales. A most important starting point for the development of amart theory was made by Austin, Edgar and Ionescu Tulcea (1974), who presented a beautiful device for proving convergence results. In Edgar, and Sucheston (1976a) the first more systematic treatment of asymptotic martingales was made. Since then several articles on asymptotic martingales have appeared in various journals, l~i~ book therefore ends with a list of references containing all papers related to the theory of asymptotic martingales that wehave been able to trace, whether cited in the text or not.

Introduction We begin by defining asymptotic martingales (amarts) and by briefly investigating how they are related to martingales, submartingales, quasimartingales and other generalizations of martingales. This is then followed by a section on the history of asymptotic martingales after which the more detailed presentation of the theory begins. In this introductory part we consider, for simplicity, only the so called ascending case. Let ~= {Tnl 1

(~,9",P) be a probability space and let

be an increasing sequence of sub-c-algebras of ~ .

(The descend-

ing case corresponds to the index set being the negative integers.) Further, let

T

T C T

be the set of bounded stopping times (relative to if and only if

integer

M

T(~) ~ ( ~ ) A net

(depending on

(aT)TE T

for all

n

and

P ( T ~ M ) =I

T) . The convention that

for almost all

only if for every all

{T=n} E T n

~ E ~,

~-}00

T ~ C

if and only if

defines a partial ordering on

of real numbers is said to converge to

g > 0

) , i.e. i for some

there exists

TO E T

such that

a

T .

if and

IaT-a I < E

for

T E T , T ~ TO . For further details about net convergence, see Neveu

(1975), page 96 (and Remark 2.4 below).

Definition. Let adapted to

{Xn}n= I

be an integrable sequence of random variables,

{~n}~=l . We call

and only if the net

(EXT)T ET

{Xn, ~'n}n=l ~

an asymptotic martingale if

converges.

The very first question is of course: Is a martingale an asymptotic martingale? The answer is yes, since, if Doob's optional sampling theorem, net

(EXT)TC T

~ {Xn, Tn}n=l E X T = EX I

is a martingale, then, by for all

T E T,

i.e. the

is constant and hence, in particular, convergent.

However, more is true. Suppose that

{ X n }I~=n

is adapted to

~ {T n}n=l

and suppose that pick

A E ~m

a.s. and

EX 7 = constant for all

7 E T . Let

m < n

be arbitrary,

arbitrarily and define the bounded stopping times

72

=

T2(~0) --

if

By assumption,

~0 ¢ A

EXTI = E X n = ~ X n d P +

71 = n

~ X ndP Ac

EXz2 = ~ XmdP + ~ X n d P . Ac Since

EXTI = EXT2 , subtraction yields

S XndP A

= S XmdP A

for

A C~m,

which is the defining relation for a martingale, i.e.

{Xn,~n}n= I

is a

martingale. The term asymptotic martingale thus enters in a natural way: Martingales, T C T

{Xn,~rn}~= I , are characterized by

and asymptotic martingales,

(EXT)7 C T

EX T = oonstc~zt

for all

{Xn,~n}~= I , are characterized by

being oonvePgent (i.e. "asymptotically constant").

Next, let

1

he a submarti

ale

ust as above one notices

that the classical definition is equivalent to: If EX 7 ~ E X .

It follows that an

7, o C T , 7 ~ ~,

then

Ll-bounded submartingale is an asymptotic

martingale. Similarly for supermartingales. A quasimartingale

(F-process) is defined as an adapted sequence

=o E EIXn- E ~ n ,,X+iI < =o, see Fisk (1965), 0rey n=l (1967) and Rao (1969). Every martingale is thus trivially a quasimartingale.

{X~'~}-~-I'L.-n~

such that

The following computations (see Edgar and Sucheston (1976a), page 200) show that every quasimartlngale is an asymptotic martingale. Choose

E > 0

and

E

.IXn-

n=n 0 and let

T C T,

T > n 0.

no

such that

Xn+ll < Since

T

is bounded there exists

n I,

such that

P ( n o ~ e ~ n I)

=

Now,

1.

nI IEXe-EXnl I= k--noY E(X~-..Xnl)l{e=k} I nl-i nl-I =I

E E E(Xn-Xn+l)l{e=k}l = k=nO n=k nl-i n

=

E E E(Xn - Xn+l) I{T n=n 0 k=n0

=k}

=

I nl-I n ETn 1 Y Z E(XnXn+l)l{T=k} <__ n--nO k--nO

=

n.-I

n

7.

z r EIx n -E ~ n=n 0 k=n o

<

<_ E EIXn-E n=n0 Next, let

< +1 If{e--k} --

nXn+ll <

• l, • 2 E T,

~.

• 1 ~ n o , 72 ~ n o

and choose

n 2 ~maX{el,T 2} .

Then IEXT I -E XT21 e lEXel - mXn2 ] + lEx 2 -EXe21 _< 2E, i.e. the net (EXT)e E T

is Cauchy and hence convergent (cf. Neveu (1975), page 96, see

also Section 2 below), i.e. {Xn,~n}~= I

is an asymptotic martingale.

The following example shows that there exist asymptotic martingales, which are not quasimartingales. Example. Let

I an ffi (_l)n "~'

n = 1,2, .... Set

{Tn }~=I ' Tn E T

arbitrarily, such that

we have

a.s.

XT ~ 0

as

n ~ ~

Xn = an

Tn ~ ~

and since

.

Since

lanl ~ i

a.s., choose an

~

0

as

n

~

it follows that

n

Ex e

~ o

as

n ~ ®.

ie

~X.~=

1

is an asymptotic m a r t i ~ a l e . , o ~

n

2 ever, Zlan-an÷ll ~ z ~ = ÷®, i.e. ~ x , ~ n =

l

is not a quasi~rtingale.

The term asymptotic martingale was motivated above by looking at the behaviour of the net

~XT)T 6 T

(which was constant for martingales and

convergent for asymptotic martingales). Another motivation for the name is

the Riesz decomposition

(see Section 6), according to which an asymptotic

martingale can be represented as a sum of a martingale and a "potential". There are of course other ways of generalizing martingales.

Let us,

instead of regarding the values of the stopped process, consider the differences

An,m = Xn -

An, m = 0

a.s.

martingale

E~ n

for all

Xn+ m , n

(see above). If

n ~ i, m ~ I . If

and

m.

A

~ 0

n,m

If

{Xn,~n}n= I

_~ IAn, l[ < ~

a.s.

as

n,m ~ ~

is a martingale

we obtain a quasiwe obtain a

martingale in the l@mit, see Mucci (1973, 1976), Blake (1978), Edgar and Sucheston (1977a) and Bellow and Dvoretzky (1980). If lity as

n,m ~ ~

we obtain a game fairer~th

A ~ O m,n

in probabi-

time, see Blake (1970),

Mucci (1973), Subramanian (1973), Edgar and Sucheston (1976e). The two latter concepts will be mentioned in the last section, but only in brevity because it turns out that there are several "useful properties" which are not satisfied for martingales in the limit and games fairer with time, see Edgar and Sucheston (1977a) and Bellow and Dvoretzky (1980). One has the inclusions m a r t i n g a l e =

quasimartingale = asymptotic martingale =martingale

in the limit = game fairer with time, but it seems as if the two last objects generate classes which are too wide to be really useful. At this point we also mention that many classical proofs for martingales are built up around the use of stopping times, and that asymptotic martingales are, roughly speaking, those objects for which these proofs remain valid. This fact may also serve as an explanation for the defining relation for asymptotic martingales - in terms of stopping times.

i. Histor 7 The first amart-like results can be found in Meyer (1971), Mertens (1972) and Rao (1970), where, essentially, a continuous time version of the following result is proved. Theorem i.i. A uniformly bounded sequence converges almost surely if and only if it is an asymptotic martingale. Remark 1.2. The names asymptotic martingale (amart) were not used and the class of stopping times was

~,

the f~n4te stopping times.

The theorem will be demonstrated in a more general form in Section 3, (Theorem 3.2). Motivated by gambling theoretic considerations Sudderth (1971) proved Theorem 1.3. Let

{Xn}~= I

be an adapted sequence and let

~

be the set

of finite stopping times. T h e n (i.I)

E lira sup X n < lira s u p E X T n -~== T6 T

(1.2)

E lim inf Xn --> lim inf EX T , n~= T£

provided the occurring expectations are well-defined. Remark 1.4.

lim sup E X T

lim i_nf E X T T6 T

correspondingly.

Remark 1.5. If

P(Xn~O)

is to be interpreted as

inf ( sup __EXT) and

= I , the second inequality together with the

ordinary Fatou lemma yields (1.3)

> lim inf E X T . lim inf E X n _> E lim inf X n -n~ n~ T6

Proof. We follow the proof given in Sudderth (1971). It is clearly enough to prove (i.i). Put

X ~ -- lira sup X n n-~¢o

and

~n = a{Xl ..... X n} , n =1,2 ....

10

If

EX* = - ~

there is nothing to prove.

Now, suppose that

EIK*I < -

large values, i.e. to construct that, of course, stopping at Choose

e > 0

= inf {n; n ~ U ( ~ ) theory we know that T E T,

T > ~

EX* =

=

The idea is to stop T £ ~

sup X n n

such that

at

gets large. Note

does not yield a stopping time.

and

o 6 T.

Define

and

E ~n X* < X n + e}

E yn X* ~ X*

XT

1

a.s.

T

by letting

~ £ 2.

for each (and in

T(~) =

L I)

as

From martingale n ~.

Thus

and it follows that

E EX*I{T=n} n=l

=

~ E(I{T=n} -/n n=l

Z EE

{T=n})

=

n=l

X*) <

Z E(I{T=n}(Xn+g)) n--i

=EXT+E.

In view of Remark 1.4 this proves (i.I). Finally, if E X * = == we consider the random variables

X ^c,

where

c

is a real number. Then, by (I.I),

n

lira sup E X T >__ lira sup E(X T AC) ~ E l l m sup(XnAC) = E ( X * A c ) ° TCT TCT n~ The conclusion now follows by letting

c ~

.

By modifying the proof of Fatou~s lemma, Sudderth also proves the following result. Theorem 1.6. Suppose further that there exists an integrable r.v.

X < Z

such that

n--

(1.4)

for all

n.

Then

E lim sup X n = lim sup E X T . n~ TC T

Similarly, if there exists an integrable r.v. for all (1.5)

Z ,

n,

W,

such that

W~X

n

then E lira inf X n = llm inf E X T . n-~== TE T

Remark 1.7. Note that Theorem 1.3 is a Fatou type l e m m a w i t h inequalities in the "wrong" direction. To prove Theorem 1.6 one therefore needs the

#!

inequality the usual way. For details see Sudderth (1971), Theorem 2. Suppose that for all

n.

If

{Xn}~= I X

~ X

is adapted and that

a.s.

as

n ~ ~

IXnl ~ Z,

integrable,

dominated convergence yields

n

EX n ~ E X

and thus, by Theorem 1.6, the net

sely, if the net converges, then

~XT)TC ~

0 ~ E(lim sup X n - lid inf Xn) = 0 , i.e. n ~

X

converges. Conver-

n ~

converges almost surely. We thus obtain the following corollary. n

Corollary 1.8. Let

{X n}n=l

for all

Z

n,

where

(1.6)

Xn

(1.7)

The net

be an adapted sequence such that

is an integrable r.v.. The following are equivalent:

converges almost surely as (EXT)T E T

The implication Remark 1.9. If

Z m c

IXnl ~ Z

n ~ m.

converges.

(1.6) ~ (1.7)

is the corollary of Sudderth (1971).

we rediscover Theorem i.I (with

T) .

Remark i.i0. Corollary 1.8 has been slighly generalized by Chen (1976b). Under the assumptions of the corollary it is, for example, shown that lim sup EX = lim sup EX (and similarly for llm inf) , i.e. under those TCT T TET T assumptions (1.6) and (1.7) are also equivalent to (1.8) i.e.

The net {X n}n=l

(EXT)T C T

converges,

is an asymptotic martingale. We shall return to the equiva-

lence of (1.6) and (1.8) in Section 3 (Theorem 3.2). It is clear that the statement implies that

"~X }~ n n=l

"{X }

is uniformly integrable"

is uniformly integrable". An example showing that

the converse does not necessarily hold is given at the end of Sudderth (1971). We shall return to this matter towards the end of Section 2 (for T). The next step in the evolution came with the papers Chacon (1974), Baxter (1974) and Austin, Edgar and lonescu Tulcea (1974). The results of Chacon and Baxter are stated for historic reasons, but

12

without proofs. Theorem 1.11 (Chacon). Let

{Xn}~= 1

be an

Ll-hounded,

adapted sequence

of random variables. Then (1.9)

E (lim sup X n - l i m

Furthermore,

if

{XT}T £ T

is

inf Xn) ~ lim sup E ( X - X T) . Ll-bounded,

then

lim sup X n

and

n ~

lim inf X

are integrable.

n

n ~

Remark 1.12. Note that if the

RHS

of

(1.9)

is

{Xn}~= 1

is an

Ll-bounded asymptotic martingale

0 , which shows that an

Ll-bounded amart is almost

surely convergent. Theorem 1.13 (Baxter). Let metric space, Xn: ~ * M,

~(M)

(~,~r~)

be a probability space,

the space of continuous functions on

n = 1,2,...,

(I.I0)

Xn

(I.ii)

( S~(XT)dB)T £ T

M

M

a compact

and

random variables. The following are equivalent:

converges pointwise

a.e.

on

converges for all

~. ~ E~(M) .

It is moreover shown that it suffices to check the net convergence in (i.ii) for a collection of functions which generate a separating class in

~(M)

(for details see Baxter (1974), page 396).

One reason for mentioning the last result is that it is an example of a more abstract result on asymptotic martingales. Apart from their own interest results of this kind seem to have applications for example in Banach space theory, see e.g. Bellow (1976a, 1978),

Brunel and Sucheston

(1976 , 1977), Edgar and Sucheston (1977b). The article that finally stimulated the last few years work on the theory of asymptotic martingales was the above mentioned paper of Austin, Edgar and Ionescu Tulcea (1974), in particular their leones 1 and 2. The former provides us with an important and elegant tool for proving convergence results. The idea is that the cluster points of a sequence of random

13 variables can be arbitrarily well approximated by stopping the sequence suitably. The precise formulation and a proof will be presented in Section 3 (Lemms 3.1). The term as~ptotic martingale first appeared in Chacon and Sucheston (1975). Since it turns out that there exist several varieties of asymptotic martingales the t e r m ~ n ~ t

is introduced in Edgar and Sucheston (1976 a, b,

c, d, e). An important variety of amarts, semiamarts, (an adapted sequence, {Xn}~= I , such that the net

(EXT)T C T

is bounded), was introduced in Edgar

and Sucheston (1976 c) and will also be discussed in the sequel. A related object called

6-amart is considered in Edgar and Sucheston (1976 a) . For

the theory of pramarts, subpramarts, orderamarts, uniform amarts, weak amarts, strong amarts etc. the interested reader may consult the papers mentioned in the third part of this volume.

2. Basic properties We follow the notation of Edgar and Sucheston (1976 a) . Let be a probability space, put denote either

N

or

of sub-o-algebras of and (TN, if

~r= -

T(m) < o(~)

(T_N)

{~rn}nED

~r

if

i.e.

~nC~m

for almost all

since

D

be an increasing family

n ~m,

TD). The convention that, for any

particular, TN

-N . Further, let

and let

= O{ U ~'n} n£ N The set of bounded stopping t~nes will be denoted by T

N ~n" nE-N

T_N,

N = {1,2,...} , -N = {..., -2,-1}

(~,~',P)

T v O C T

~

defines

and

~

z,o q T, T ~ O a

T ^ o C T

and set

if and only

partial ordering on if

T,O C T,

T . In

it follows that

is filtering to the right (left).

Definition 2.1. The net

of real numbers converges to

(aT)T C T

a

if and

only if V~ >0

3 T O E TD

T ~ TO)

If no means that

we have

such that

with

VT C TN

T ~ TO

(VT C T_N

Iaz - a I < c.

O-algebras are mentloned, the statement that Xn

is

~r-measurablen

for all

n C D

with

{Xn}nE D

is adapted

~n = °{Xk; k _< n}.

For a finite stopping time, T, we define the random variable through the relation

with

XT

(XT)(w) = XT(~)(~ ) .

Definition 2.2. Let

{Xn}n C D

be an integrable family of random variables,

which is adapted to

{~rn}nCD " We call

{Xn'~rn}nED

(i)

a martingale if and only if

EX T = constant for all

(ii)

an asymptotic martingale (umuPt) if and only if the net

Z q T ~XT)T E T

is convergent (iJ/) a sem~umc~t if and only if the net

(EXT)T C T

Remark 2.3. It was shown in the introduction

is bounded.

(for the case

D =N)

that the

15

definition of a martingale given above is equivalent to the usual definition. The reason for using thing in terms of the net

(i)

here is that it allows us to define every-

(EXT)T £ T "

Remark 2.4. It follows immediately from Neveu (1975), page 96, that

{xn'Tn}n c D (ii')

is an amart

if E X T

converges as Inl~ ~

for every

sequence of

n

bounded stopping times

{Tn}n£D,

such that

ITnl ~ ~

~XT)TCT

is Cauchy, i.e. if

as Ini~ ~ ,

and also (ii")

if and only if the net such that for all

•,o~

o)

T,O E T N

we have

with

IEX~-EX~I <

T,O ~ T O

VE > 0 3 T 0 6 T D

(T,O £ T_N

with

~.

We immediately observe that every martingale is an amart (cf. Remark 2.3) and note that it seems reasonable to guess that every amart is a semlamart.

Theorem 2.5. Every martingale is an amart and every amart is a semiamart.

Proof. The first statement was proved in the introduction (for

D =N). For

the second statement we follow Edgar and Sucheston (1976 a) , L~mraa 1.2. Only the case

D = N

is considered, the case

Because of the convergence of that

IEXno

T v no~n

0

EXTI < I

for all

(EXT)T C T

D = -N

being the same.

we can choose

T > n o . Let

T C TN

Xn O

it follows that

IEXTI<_I xT^nol ÷I<_E max

IXkl ÷I<--,

1 <_k<.n 0 i.e.

sup ~XTI < co, which proves the assertion. T

such

be arbitrary. Since

and

X T = XT ^ n O + X ~ v n o

no 6 N

16

It follows immediately from the definition that linear combinations of amarts (semi~marts) are amarts (semiamarts). The following results establish (essentially) that the positive and negative parts of amarts (semiamarts) are amarts (semiamarts) and some consequences thereof. The problem of whether or not powers of amarts are amarts is more complicated than in the case of martingales (cf. Bellow (1976 b, 1977 ), Gut (1982)) and will be dealt with in Section 5. + Set x = x v 0 and x- = - ( x ^ O )

for all real

Lemma 2.6. Let

{~n}n6D " If

{Xn}nED

be adapted to

further that the sequence is (a)

Assume, for

(EX~)T £ T

(b)

If

EIX_I I < ~

(EX~)T 6 T " If

(EX~)T£ T

{Xn,Tn}nC D

{Xn,~rn}nE D and

and

. If

~XT)T C T

is bounded above. If

(EX~)~E T,

D = N,

suppose

Ll-bounded.

D = -N , that

above, then so is

x.

(EXT)T C T

(EXT)T £ T

is bounded

is bounded below, then is bounded, then so are

(EIXTI)T i T "

is a semiamart, then so are

{Xn+, ~ n } n C D ,

{[Xn],~n}nE D.

(c>

if

.

and

{IXn],~C'n}ne D .

is ana

then soare

I x ^ y = ~(x+y

From the relations = ½ ( x + y + Ix-yl)

r,,

Cx+.r#nCO.

- Ix-yl)

and

.

x v y =

and the preceding results the following corollary is

innnediate.

Corollary 2.7. Let

{Xn,~n}nE D

Suppose further that they are and

{XnAYn'~n}n E D

are

and

{Yn,~rn}nED

Ll-bounded if

Ll-bounded m a r t s

D=N.

be amarts (semiamarts). Then

{XnvYn,~rn}n£D

(semi~m~rts).

Remark2.8. Lemma 2.6.c is stated and proved in Austin, Edgar and Ionescu Tulcea (1974), Lemma 2

for the case

D = N . For Corollary 2.7, see Edgar

17

and Sucheston (1976 a) , Proposition 1.3, where a direct proof is given (which then is used to prove a) and c ) o f

Lemma 2.6 through relations like

+ x

= x v O , ef. their Corollary 1.4). See also Baxter (1974), page 397.

Remark 2.9. If

{Xn'~n}n6 D

{Xn'~rn}n£D+ ' {Xn'~n}nED {Xn,~rn}n6 D

is a martingale it is well known that and

{IXnl,~n}n6 D

is a submartingale,

then so is

are submartingales and if {X+,~rn}n£D,

is guaranteed for the others. However, since every is an amart, it follows e.g. that if

rtingule, then

D and

{Xn,~n}n6 D

whereas nothing

Ll-bounded submartingale is an

Ll-bounded sub-

IXni, }ne D are

rts. +

Proof of Lemma 2.6. (~) Since is

a real

D = N.

number,

Let

it

T C TN

x- = -(-x) +

suffices

to prove

and choose

and

the

net.

first

Ixl = x

+ x-,

where

statement.

(This is possible since

t

is

bounded). Define

It

on

{X t

Z O)

In

on

{X t < 0}.

G

Clearly, G 6 T N

and

E X ~ = EX t • I{X t > O }

+ E X n. I{X < O} . Thus

--

t

o <_EX~ = E X t • I{Xt >_0) --EX o - E X - I { X t < O }

<_

-< sup E X O + sup EIXnl < ==. ~6 T N n

D = -N.

Let

T 6 T N

~ G =

Here

-I

and define

on {xt ~ O) on {x~ < O}.

plays the rSle of

OeEX

n

=EX a - E x

above. Calculations as above yield

I I<Xt
sup

EX a+Elx_ll <--.

a6 T N (~)

Immediate from the definition of a semiamart and

(~)

Again, it suffices to consider

{X~,~n}nC D .

(a).

x

18

D = N.

We follow the proofs given in Baxter (1974), page 397 and Austin,

Edgar and lonescu Tulcea (1974), pages 20-21. Since the net

(EXT)T 6 T

is convergent it follows from Theorem 2.5 + that it is bounded and hence, from (a), that the net (EXT)T E T is bounded. Thus, given

E > 0

(2.1)

IEXT - E X

(2.2)

EX: ~ E X ~ I + e

Now, given

there exist [< e

~ ~ TI

TO, T I £ T

with

for all

T, a ~ TO

for all

a ~ T1 .

arbitrarily, we define

c

on

{XTI ~ O}

TI

on

{XTI < 0}.

T I ~ T0,

~i E T

such that

by

cI =

Then (2.3)

EXTI = E X +TI +EXTI • I{XTI < O}

(2.4)

gxg I = E X g " I{XTI >_ O} +EXTI • I{XTI < O} . By subtracting

(2.4)

from

(2.3)

we obtain

EXTI - E X I =EX~I - E X I{XTI > O} , which together with

(2.1)

yields

E X+TI_< E+EXI{XTI_>O}_<~+EX÷t{X~l->°}-< E+EX+.o We have thus proved that (2.5)

EX + < e +EX: T I --

which together with

(2.6)

(2.2)

for

~ > T1 ,

yields

IEX: -EX~I <__e for ~ > T 1 > TO • 1 By performing the same calculations with

and

~1

replaced by

~' we obtain 1

~

(2.6) with

replaced by ~

~' > T 1

replaced by

a'

and

19

thus that (2.7)

] ~ x ~ - ~ x ~ ,+ I ~ 2 ~ + ~XT)T CT

i.e. the net

for

o, a' ¢ T,

~, ~'_> t o ,

is Cauchy and hence convergent

(cf. Remark 2.4).

This proves the assertion. D = -N.

In several instances the proofs for the cases

D = N

and

D = -N

are identical except for "obvious" changes. This time, however, this is not so, which is seen as follows. If, given such that and

e > 0,

(2.1)

o I 6 T_N

one chooses

and

(2.2)

TO, T I

hold for

O

T, ~ ~ T 0

as above, it turns out that

This is so because the order between

and

T1

and

T_N, @ ~ TI

with

TI~T 0

respectively

is no% a stopping time.

OI and

in

~

has been reversed.

To prove the desired results we thus have to modify the above proof so that rSles of fact that

~I o

will be a stopping time. This is accomplished by reversing the and

(EX~)T E T

Thus, given (2.8)

T1

in the definition of

(and by using the (trivial)

is bounded beZow).

E > 0

IEX T -EX~I

there exists

tO £ T

such that

~ £

T, ~ T

0.

for all

~ X +T)T £ T

Further, since

@i

is bounded below there exists

such that (2.9)

EX + >EX + - e ~-TI Now, choose

01 =

~ < T1

{

for all

o < T I.

arbitrarily and define

~

on

{x o > o}

TI

on

{X o < O} .

~i 6 T

Calculations like those above yield (2.10)

EXTI =EXTI.I{X c >__ 0} +EXTI'I{X O < O}

(2.11)

EX~I = E X ~

+ E X T I - I { X ~ < O} ,

by

T 1 < tO

20

from which it follows by subtraction and (2.12)

(2.8)

that

E X $ < E X + + e. TI - -

By combining

(2.12)

and

(2.9)

IE xa+ -Ex~ 1 I ~ e

(2.13)

we obtain

for all

Finally, to prove that the net

C ~ T I ~ TO •

(EX~) T E~T_N

is Cauchy, one proceeds

exactly as in the ascending case. The proof is complete. The second part of the following result is a "maximal" lemm~, cf. Chacon and Sucheston (1975), Lemm8 1 for

D = N

and Edgar and Sucheston

(1976 a) , Le~ma I.i. Le~8 is

2.10. Assume that

Ll-bounded if

(i)

is a semi~m, rt, which, in addition,

{Xn'~n}n 6 D

D = N . Then

sup Eix~i < ® T

X- P( sup IXnl >X) e sup EIXTI

(ii)

nED (iii)

IXnl < ~

sup nCD

Proof. (i)

a.s.

is immediate from Lermm 2.6.a.

The proof of set

T

A = {

(ii)

sup IXnl >I}

follows "the usual pattern". Let

O 6 T

= k - P(

and

o

o

on

Ac

and

IXnl > k} on

A

o

if

D = -N.

sup EIXTI [E[Xql ~ EIXsI'I{A} ~ I P ( A ) = T IXnI > k) . The conclusion follows by letting n o

sup

be fixed,

and define

Inl~n° I min{n C D; Inl ~ n 0

Then

nO £ N

~>

increase

Inl ~no to infinity. (iii)

follows immediately from

(ii)

by letting

1

tend to infinity.

21

From the theory of martingales martingales

(D =-N)

it is well known that reversed

behave more "nicely" than ordinary ones

(D = N).

In

contrast to the latter ones they are always uniformly integrable and converge almost surely and in

L I . It is therefore not surprising that in

the results above the assumption about the case

D = N

the case

D = -N

Ll-boundedness was made only for

and that this condition is automatically satisfied for (el. e.g. Lemma 2.10 (i), according to which

sup EIXnl n

sup EIXT[ < ~) . We further observe that in the proof of L e ~ 2.6.c T the fact that {X +n'~n}nE D is a semiamart was explicitly used only for D = N , since for ÷ ~ X T ) T E T_ N

the (obvious) existence of a lower bound of

was used (formula (2.9)).

Further, if {Xn}n C - N

D = -N

{Xn'~n}nE-N

is a (super) martingale,

uniformly integrable,

in fact

{XT}T E T_ N

then not only is

is uniformly inte-

grable (see e.g. Meyer (1966), page 126). The object of the final result of this section is to establish this uniform integrability for descending semiamarts, but before stating the result we make the following definition and some comments. Definition 2.11. Let {Xn}nCD

is

integrable,

(2.14)

{Xn}nE D

be adapted to

T-uniformly integrable i.e. if for any given

if the set

E > 0

sup EIX~I" ~IxTI > ~ < c

{~n}nED " We say that (XT}T E T

there exists

for all

is uniformly

%0 ' such that

~ > ~0"

T It is trivially seen that every

T-uniformly integrable sequence also

is uniformly integrable. For the ascending case we further know that every uniformly integrable (super)martingale

is, in fact, T-uniformly integrable

(see Meyer (1966), page 126) and also that every uniformly integrable amart is

T-uniformly integrable

(see Edgar and Sucheston (1976 a), page 210). For

the descending case, however, more is true. Theorem 2.12. I) = -N. Every semiamart is

T-uniformly integrable.

22

This is Theorem 2.9 of Edgar and Sucheston (1976 a) . Proof. It follows from Lemm~ 2.10 that for every TO C T_N

e > 0

there exists

such that

EIx~I ~ EIX~oI + c for all T c T_N,

(2.1s)

and, further, n o ~ T O

(2.16)

E

Now, let

and

X0

such that

max IXnl.l{suplXn[ >l} < E no<_
be arbitrary and

for all

~ > %0"

I > A O.

Since

EIXcI'I{Ix~I > ~} = = EIX I-I{IX I >%, ~ > no } + EIX~I-I{IXal >X,

~E

o ~ n O}

max Ixi-I{suplxl>A} + Elxo^nol'I{lXc^noi>X} no~
n

~ + ElXo^nol-X{IXo^nol > ~ } it suffices to prove uniform integrability for To this end, let

T E T_N,

T ~ n O ~ T0

T E T_N,

where

be arbitrary, let

T~n E

0 . and

be as above and define

{

T

TI =

on

{IxTI >~}

30 on { I E T I ~ } .

Clearly, T I 6 T_N.

Furthermore,

EIX~ll = EIx, I'~Ix~I >x) ÷ EIx%I.~IxTI ~ x} and hence, by

(2.15)

and

(2.16)

it follows that

+ zlXTol.~{Ixl >~} _< ~ + E,~<~__lmaxIx=l-~{s~plxl > x} _< e + C which completes the proof.

= 2c,

3. Convergence The first result of this section is the "elementary but extremely useful" approximation lepta which was mentioned in Section 1. It first appeared for the case

D=N

in Austin, Edgar and lonescu Tulcea (1974),

page 18. For the extension to the case (1976 a) , page 202.

D = -N , see Edgar and Sucheston D = N , see also Billingsley (1979),

For the proof when

problem 35.23, pages 428 and 503. L~-,,e 3.1 (a) D f N . for every

~ C ~

Let

Y

~r-measurable random variable, such that

be an

the number

is a cluster point of the sequence

Y(~)

{Xn(~)}nE N . Then there exists a sequence Tk+ I _> Tk

and

T k > k,

X

-~ Y

{Tk}kEN'

Tk C T N,

where

such that

a.s.

as

k-~.

Tk (b) D = - N . every

Let

~ E ~

~__-measurable random variable, such that for

be an

the number

{Xn(~)}nE_N. Tk_ I ~ Tk

Y

Y(w)

is a cluster point of the sequence

Then there exists a sequence

and

Tk ~ k,

X,rk ~ Y

{Tk}k6_N,

(3.1)

r 6 T,

where

such that

a.s.

as

k ~-~

.

Proof. In both cases it suffices to show that for each there exists

TkCT_N,

with

n 6 D

and

£ > 0

IT[ t In[ , such that

P([X -Y[ ~ ~) > I-

~.

The le-,,a then follows by induction by generating an increasing (decreasing) sequence of bounded stopping times {Tn}n C N with the property that P XT---~Y as n ~ . The conclusion is then obtained by taking a subsequence n (cf. Austin, Edgar and lonescu Tulcea (1974), page 19 and Edgar and Sucheston (1976 a) , page 202). We begin with the proof of

(b), since it is easier.

24

D = -N. Fix

n O E -N

{Xn(W)}nE-N

(3.2)

and

for each

e > O.

w E ~

Y(W)

Since

is a cluster point of

we have

~ = {~0; [Xn(~0)-Y(w)l <__ ~

for some

n <_no}.

A = {~; [Xn(W )-Y(w)[

for some

n,

Set (3.3) Since the set pick

nI

A

! ~

increases towards

(~ no)

such that

~

as

P(A) > i - E.

rain{n; n l ! n ! n

0

nI

n I < n < no } .

decreases we can (and do)

Define

T

as follows:

and

for

~CA

T = no Since

Y

is

for

~_-measurable

~-measurablen fop a ~ i.e.

~ ~ A .

T C T_N.

and

nE-N.

Further,

which we conclude that

~ - ~ = n ~ - N ~n

Therefore,

IXT(w)-Y(~)I

it follows that

{T =n} 6 ~rn for all

~ e

if and only if

P(IXT- YI ~e) > i - e , which is

Y

is

n C -N,

w E A,

from

(3.1).

D = N. The idea here is the same, but in this case we cannot conclude that Y nO

is

7-measurable for all n and E > O , there exist

measurable and such that is a cluster point o f

(3.4)

n , since n' ~ n O

P([Y-Y'I

{Xn(W)} n E N

~ and

= ~( U ~n) . However, given n£ N Y' such that Y' is ~n' -

~ ~/3) > i - ~/3 . Further, since it follows that

{m;Iy'(~)-y(m)l< E I 3 } c { ~ ; I X n C W ) - Y ' ( w )

and consequently there exists A ={~; Now, define

T

n" > n'

I <2C/3

for some

n>n'}

P(A) > i - 2£/3 , where

for some

n,

n' < n < n"}.

by

I min{n; n' < n < n " n" and

such that

IXn(0~)-Y'(~0)l <__2~/3

T=

Then, T E T N

Y(~)

if

w ~ A.

and

IXn(W)-Y'(w)l

!2E/3}

if ~ E A

25

P(IXT--YI >e) ~ P(IX T -Y'I >2e/3) +

P(IY'-YI

>e/3) < e.

This concludes the proof.

Theorem 3.2. Let

{Xn}n 6 D

E sup IXnl < ~ . n

(i)

Xn

(ii)

{Xn}n C D

be an adapted sequence and suppose that

The following statements are equivalent:

converges

a.s.

In I " "

as

is an asymptotic martingale.

Remark 3.3. This is Proposition D =N

2.2 of Edgar and Sucheston (1976 a) . For

the result was earlier proved by Austin, Edgar and lonescu Tulcea

(1974), page 19. Compare also Baxter (1974), (Theorem 1.13 above). Note that, for uniformly bounded sequences of random variables the supremum is trivially integrable and thus Theorem I.I is an immediate corollary.

Proof. D = N . {Tn}n C N as

(i) ~ (ii)

Suppose that

Xn~

Y

a.s.

as

n ~.

Let

be a sequence of bounded stopping times increasing to infinity

n ~.

~ Y a.s. as n ~ , which together with the inten grability of the supremum (IX T I ~ supIXnl) and dominated convergence n n implies that E X T ~ E Y as n ~ , from which the assertion follows in n view of Remark 2.4. (ii) ~ (i)

Then,

XT

X* = limsup X n and X, = liminf X n . According to Lemma n~ n~ 3.1 there exist two sequences of increasing bounded stopping times, {rn}nEN (3.5)

Set

and

{Gn}n£N' X

T

~ X*

such that

and

X

n

~ X,

a.s.

as

n ~.

n

Since

IX~ - X T I <_. 2 suplXnl , which is integrable it follows by n n n dominated convergence and the amart property that

(3.6)

O < E(X*-X,) --

and hence that

X* = X,

= lim E(X_ -Xon) = O , n-,o= tn

a.s.

26 The proof for the case

D •-N

Remark 3.4. In the proof of

is the same.

(ii) ~ (i)

order to conclude that the limit in

the amart property was used in

(3.6)

is

{Xn'~n}n6D

is a semi~mgrt we obtain

(3.7)

E(X* - X.) ~ limsup E(X O - X T) , T,O E T

0 . If we only assume that

which is a slightly weaker form of the theorem of Chacon (1974), i.e. Theorem i.ii above (see also Chen (1976 a,b) ). Note further that holds for the case

D •-N

(3.7)

too (see also Edgar and Sucheston (1976 a) ,

page 213). We are now ready to prove the amart convergence theorem.

{Xn,~n}ne D be an asymptotic martingale and suppose, if

Theorem 3 . 5 . Let DffiN,

in addition that it is

Remark 3.6. For

D =N

Ll-bounded. Then

X

n

converges

a.s.

as

this is Theorem 2 of Austin, Edgar and lonescu

Tulcea (1974). Our proof follows Edgar and Sucheston (1976 a) , page 203. Proof. Pick

~ > O

and set

Y

{Yn'~n}n C D

is an amart by Corollary 2.7, which, furthermore is uniformly

n

= -~ v X

n

bounded. It follows from Theorem 3.2 that

Inl

~ ~.

Finally, since

{gn}nC D

and

^ ~

Y

n

for

n E D.

Then

converges almost surely as

{Xn}nED

differ on the set

{sup IXnl > ~} , whose measure can be made arbitrarily small by choosing n % large enough (see L ~ a 2.10), we conclude that X n converges almost surely too. Some immediate corollaries are: 3.7. Every reversed martingale and every

Ll-bounded reversed submartingale

is almost surely convergent. 3.8. Every

Ll-boundedmartingale

almost surely convergent.

and every

Ll-bounded submartingale is

27 3.9. Every descending amart converges in

L I . This follows from the

uniform integrability (Theorem 2.12). It is worth mentioning that the proof of the amart convergence theorem differs from the proofs used to prove martingale convergence. The following result (see Gut (1982), Theorem 4.1), which will be used in the sequel, is a minor strengthening of Theorem 3.2. Theorem 3.10. Let

{Xn}nED

be adapted to

{~n}nED

and

T-uniformly inte-

grable. The following assertions are equivalent: (i)

Xn

converges

(ii)

{Xn'Yn}nC D

a.e.

as

Inl

~

is an asymptotic martingale.

For a related result for the case

D =N,

continuous time and finite

stopping times, see Mertens (1972), T Ii. Corollaire. Since, by Theorem 2.12, the above uniform integrability condition is satisfied for every descending semiamart, the following corollary is immediate. Corollary 3.11. Let

{Xn'~rn}ne -N

{Xn'~rn}n£ -N

be an

a.s.

convergent samiamart. Then

i s an amart.

Remark 3.12. There exist

a.s.

convergent ascending semi~m~rts that are

not amarts. See Austin, Edgar and lonescu Tulcea (1974), page 19 and Example 4.2 below.

Remark 3.13. Since

{XTI <_ s u p ] X I

for all

TC Z

it is clear that

n

E supIXn] < ~

implies that

{Xn}ne D

is

T-uniformly integrable. However,

n

according to Blackwell and Dubins (1963), Theorem 2, there are

a.s.

con-

vergent martingales (and hence amarts), {Xn,~n}nC D , which are uniformly integrable, and hence for which

E supIXnl n

T-uniformly integrable (see Meyer (1966), page 126), is not finite. For

D=-N

see also Remark 3.16 below.

28 Remark 3.14. The examples of Section 4 below show that Theorem 3.10 and Corollary 3.11 cannot be (essentially) improved. Proof of Theorem 3.10 (i) ~ (ii).

D =N. Let

sequence of bounded stopping times. Since it follows that {XTn}~=I

Xn~

X , say,

a.s.

as

n ~

XT

~ X a.s. as n ~ ~ and since, in particular, n is uniformly integrable we conclude that E X T n ~ E X as n ~ m ,

which in view of Remark 2.4 implies that The proof for the case (ii) ~ (i). is

{Zn}n C N ' be an increasing

D = -N

{Xn'Jrn}nC N

is an ~m~rt.

is the same.

The uniform integrability implies in particular that

Ll-bounded and thus, by Theorem 3.5, a.s.

{Xn}n C D

convergent.

As an application an amart related to the Marcinkiewicz strong law of largenumbers

(see Lo~ve (1963), pages 242-243) is presented. Recall that

in the case of the classical Kolmogorov strong law of large numbers the sequence of arithmetic means constitutes a reversed martingale. Example 3.15. Let

b e independent, identically distributed (i.i.d.)

{~n}~=l

random variables. Suppose that that

E~I = O

if

[n -I/r .

~

k=l k

if

I <_ r < 2

~'-n

O < r < 2

and further

Ir

if

0 < r < i

-n n i. I k

and

for

i < r < 2 . Put

=~ X

EI~I Ir < ~

o{~;

k < -n}

for

n = 1,2,

Then

{Xn,~

is an

nm~Tt.

Proof. Let

r = 1 . Since

{Xn'~n}n£-N

is a martingale and since mar-

tlngales are amarts we are done. Let

i < r < 2.

Then

E suplXnl < ~ by Klass (1974), page 904. The n Marcinklewlcz law implies that X * 0 a.s. as n * - ~ and so an applin cation of Theorem 3.2 yields the desired conclusion.

2g n

Now, let where

0 < r < I.

Set

Y-n = n-l" I I~k Ir and ,.=I z% L

Z

-n

--E(i~iIrISrn) '

n = 1,2, .... n

Since

~ ~kl r -< X_n = n-l.I k=l

n-l.

n

~ l~kl k--I

r

-- Y -n

is adapted it follows (recalling interchangeability)

X

-n

7- n

=E

X

<E -n

7- n

Y

m

-n

=Z

and since

{Xn}ne_N

that

-n

Thus, (3.8)

O < Xn < Z --

for

n = ..., -3, -2, -I .

n

Now, {Zn,~n} n C - N

is a martingale and thus

(see Meyer (1966), page 126), which in view of {Xn}n £ -N

is

T-uniformly integrable (3.8)

implies that

T-uniformly integrable. The 8msrt property now follows from

Theorem 3.10. Remark 3.16. In Example 3.15 we used Theorem 3.2 for the case

i < r < 2.

n_i/r, n This was possible because E sup I E ~kI < ~ . For the case O < r < i n k=l n Theorem 3.2 is not applicable because E sup n -I. I E ~k [r < ~ if n k=l and 0nly if E[~l[r'log+l~l I < ~ (see Gut (1979), Theorem 3.2) and the latter condition was not assumed. We thus have obtained an example (for D = -N) , where Theorem 3.10 applies and where Theorem 3.2 does not. Remark 3.17. Example 3.15 can be used to illustrate the importance of the a-algebras relative to which a sequence is adapted. Consider the case 0 < r < i D -- -N

and suppose further that

and

~-n = ~ { ~ ;

k <__-n}

~i' ~2"'"

all are non-negative.

we thus know that

{Xn'~rn}nE-N

If

is an

n

amart. However, let

= n-ll Y ~k Ir and ~n = ~ { ~ ; k < n } , n k=l n--l,2, .... According to Krengel and Sucheston (1978), Corollary 4.4, {Xn'~rn}n £ N

X

is a sem~-m~rt if and only if

only assumed that (1979) ,

D=N,

E~

Since we have

< o~ it follows from the previous remark (i.e. Gut

Theorem 3.2) that

sup X n

in the ascending case

E sup X < co. n n

{Xn'~n}n E N

is not necessarily integrable and so n

is not even a semlamart.

30

Except for special examples constructed like those of Section 4 below, Example 3.15 seems to be the first example of an amart which is not a martingale,

or a submartingale etc. Unfortunately,

used the strong Marcinkiewicz

though~we have

law in the proof. It would therefore be

interesting to obtain a direct proof of the amart property, and thus, as a corollary, a new proof of the Marcinkiewicz

strong law. This would in

a natural way generalize the martingale proof of the Kolmogorov strong law of large numbers to an amart proof of the Marcinkiewicz

strong law.

4. Some exampl,es This section contains some examples which illustrate certain pathologies. They will be used in Section 5 in the investigation of stability properties (cf. Gut (19 82)). Throughout

(G,~rp)

is the Lebesgue measure space and for any

sequence of random variables, { X n } n e D , Example 4.1. For

~nffiG{~; k ~ n},

n e D.

n £ N , define

{~ n

Xn(~) =

if

w E (O,2 -n)

if

~ £ [2-n,l) •

This yields an a.s. convergent martingale (and thus also an a.s. convergent amart) which is not uniformly integrahle and E X if

n

= i

for all

(Xn~ 0

a.s.

as

n ~

n) , see Doob (1953), pages 347-348. Recall that,

D ffi-N , every martingale is uniformly integrable (see also Theorem

2.12). Example 4.2. For

p > i

X (p) s 0 2n

When

p=l,

and

and

n E N,

X~Pn)+I(~)

..(I), ~r(1)} {An n n£N

let

Io

if

~0 C [2-n,l) .

is an a.s. convergent semiamart that

fails to be an amart, see Austin, Edgar and lonescu Tulcea (1974), page 19. E suplXnl ffi Y. 2n/P. 2-(n+l) < ~o. Since the sequence n kffil is a.s. convergent, an application of Theorem 3.2 shows that If

p > I, then

Y(P) ~ P ) "~n " n }nEN

is an smart.

Example 4.3. This example is related to that of Sudderth (1971), page 2145. Let

p > 112

and define [| n I/p

if

co C

y n(~)

for

i=l,2,...,n

ffi I 0

otherwise

and

n =1,2, ....

2 '

32

The s e q u e n c e 2 YI'

{x(P)}nn EN

Y22 ''''' Y In '

(4.1)

x,p,C~ -~ O n Define

i s now d e f i n e d a s t h e sequence

Y2n ''''' ~n ' .... It is easily verified that a.s.

{Tn}nEN

and in

+ min{k ~ n ;

Tn(~) ffi n ( n + l )

among

if

C T

and

n

(4.2) Let

~k(~) ÷ 0~

X

Y

among

T 7~

for

1 < k < n.

which corresponds to the first

that is non-zero and

that corresponds to the last zero. Clearly, T

n ~o.

~k(w) = O

equals the index of the

Yln ,..., Ynn

as

as follows:

(n-2 1)n

Thus, Tn

LI

as

Tn

equals the index of the

YIn ~ ' " ' n ~.

ynn

Y X

if the latter are all

Furthermore,

n

EX T (p) ffi E max{Y~ . . . . . Y~} ffi n ( 1 / p ) - I n 1/2 < p < 1 .

yields

Then E x ( P ) - ~ + ~

as

n ~,

an example o f a u n i f o r m l y i n t e g r a b l e

which t o g e t h e r w i t h a.s.

(4.1)

c o n v e r g e n t s e q u e n c e which

fails to he a semiamart. Next, let that

{X~ 1)

a.s.

as

'

p = 1 . Then

E X (1) = I and in view of Tn fails to be an amart. Further,

~(I)} n nCN

n ~ =,

it follows that

(4.1)

it follows

since

X (I) ~ 0 Tn

= -~X(1)~ T n -nffil ' and hence that

{X$1)}T E T ' i~ not uniformly integrable. Finally,

let

it follows that

E suplX~P)l < ~ , n

Theor. 3 2 shows that Example 4 . 4 . L e t

p~

P)>nCN 1 , nE-N

x ( p ) ( ~ ) ffi I 2 n / p -n

-

1 P(sup]X~(p) i ffik l / P ) ffi n which together with (4.1) and

p > I . Then, since

[O

We first note that

is an

and d e f i n e

if

~ £ (0,2 -n)

if

~ E [2-n,1).

33

(4.3) Let

x,p,t~ , 0 n p=i

a.s.

as

n ~m

and that

~_{x,p,} _ t n n £ -N

and introduce the (finite) stopping time

T

is

Ll-bounded.

by

inf{kq-N; x~P)(~) # O}

if an and the sequence

{Tn}nCN'

Tn C T_N

Tn = T v ( - n ) . A simple compu-

by

tation yields (4.4)

E X (I) = n + l

Tn

which shows that If

---~

~

n ~ ~,

as

{X~ I) , ~ n l ) } n C _ N

p > i , then

it follows that

~

is not a semiamart.

E s~p IXn(P) I < ~

~r(P) ~nE-N {X~ p) '~ n ~

and so, by

(4.3)

and Theorem 3.2,

is an amart.

Remark 4.5. Note the difference between Example 4.1 and Example 4.4 with p = I . Just as in Remark 3.17 the different behaviours for D •-N

D =N

and

are due to the different sets of (bounded) stopping times. In the

present case we observe in particular that it is possible to stop at

sup X (I) n n

D=-N

~X(1)~ " n ~£ D

(which is not integrable) with a finite stopping time if

(i.e.

%

in Example 4.4), something that is not possible when

D =N.

A difference between the present case and the case discussed in Remark 3.17 is, however, that here the "better" behaviour occurs when Example 4.6. Let 4.3 and define

p > 1/2 , define {X (p)

n

{Y~; I < i < n, n ~ l } •

as

}nE-N

D=N .

yn

"" '

n

n

as in Example 2

2

i

n''''' Y2 "YI ''''' Y2 'YI 'YI "

We have (4.5)

X (p) ~ 0

a.s.

and in

LI

as

n ~-~.

n

To continue the analogy with Example 4.3 define n

equal the index of the

Yln ,... , Ynn

X

which corresponds to the ~z8t

that is non-zero and by letting

that corresponds to the ~irst

{Tn}n6 N

Y

among

Tn

by letting Y

among

equal the index of the

YIn ''''' yn n

X

if the latter are all

34

zero. Thus

Tn C T_N,

Tn + - ~

(4.6)

E X (p) = n (I/p)-I T n Just as above the case

and

1/2 < p < I

yields an example of a uniformly

integrable a.s. convergent sequence which fails to be a semiamart. When p=i

•

~X (I) }

~ n

n E -N

is uniformly integrable but not

grable, in particular, {X(1) n '~n i) } n C - N 2.12). Finally, for

T-uniformly inte-

is not a semiamart (by Theorem

p > i , {X(p)n'~nP)}nC-N

is an amart.

For the construction of amarts and semlamarts we also refer to Krengel and Sucheston (1978), pages 217-223.

5. Stability This section deals with the following problem: Given an smart ~: R ~

and a function

R,

{~(Xn)'~n}nED

when is

an ~m~rt?

The first result of this kind is that the conclusion holds for +

~O(x) = Ixl , x (L~a

and

x

, provided

2.6). For the case

D •N,

and sufficient conditions on Here the case

D =-N

{Xn}nCD

is

Ll-bounded when

D=N

Bellow (1976 b, 1977 ) gives necessary

~

for the conclusion to hold in general.

will also be covered. The proofs differ slightly

from those given in Bellow (1977) . We also investigate which further assumptions on the amart one needs for the conclusion to remain valid when the necessary conditions on

~

no longer are satisfied.

Following Bellow (1976b, 1977 )

such problems are called stability

problems. Theorem 5.1. Let that

{Xn}nEN

(5.1)

is

~

(5.2)

{Xn'~n}nED

be an amart. If

Ll-bounded. Let

D = N , assume, in addition, be a function such that

~: R ~ R

is continuous and

lim

~(x)

and

lim

~(x)

X

exist and are finite.

X

X ~

X ~ --~

Then, {~(Xn),~n} n C D

is an

Ll-bounded amart. +

Remark 5.2. The cases obviously included. For

~(x) = Ix[, D = N,

x

and

x

mentioned above are

Bellow (1977) , Theorem 2, shows that

(5.1) and (5.2) are necessary and sufficient for an

{~(Xn)'~n}nCN

to be

Ll-bounded amart.

Proof. We first assume that

X

> O, n

~(O) = 0

and

lim ~,x~ = O.

--

x x ~ m

By the amart convergence theorem we know that In[ ~ m (5.3)

and thus, by o(x)

(5.1), also that

converges

a.s.

as

Ini '" ® .

In

converges a.s. as

36 By invoking Theorem 3.10 and Corollary 3.11 it therefore remains to show that (5.4)

{~(Xn)'~n}nE-N

(5.5)

{~(XT)}T q T N

is a semiamart.

is uniformly integrable.

We first consider the

Ll-boundedness of

By assumption, x-l-l~(x)l < E if

0 < x < M.

if

{~(XT)}Z E T "

and

x > M

I~(~)[ ~ 0 '

say,

Thus,

E[~(XT) [ = E[~(XT)['I{X T ~ M} + EI~(XT)['I{XT>M} ~ ~o'P(XT ~M) + EEXT'I{XT>M} ~ 0

+ E supEX T < =, T

since every ~m~rt is a semiamart. Thus, {~(Xn),~n} n E D and, in particular, if Now, let

D = N.

D =-N

is a semiamart

we are done.

A similar argument together with the maximal inequa-

lity, Lemma 2.10 (ii), yields

Z[~(Xz)['X{[~(Xz) [ > A} = s[~(xz)[.z([~(xz) [ > A,

= x z ~ M} + z[~(xz)[.z{[~(xz) [ > A,

~ o ' P ( I ~ ( X T ) I > A) + S E X T ~ o ' A - I ' s u p T

x z >M} <

E[~(XT) I + e s u p Z X T
Consequently,

lim sup E[~(Xz)I.Z{I~(XT) I > A) ~ E sup ZX T A~ and, since

e

T

may be chosen arbitrarily small, (5.5) follows.

It now remains to remove the restrictions lim ~(x) x

= 0

made a b o v e ( c f .

Assume that Set

X

> O, n--

~(x) = ~(x) - ax.

X

> 0, n--

~(0) = 0

Bellow (1977)).

~(0) = 0

Then, since

and that

x-l.~(x) ~

x-l.~(x) ~ 0

as

~ 0

as

x ~.

x ~,

{~ (x) '~.}n c D is an ~m~rt and because of the linearity is too.

and

{~(Xn)'~n}n E D

37

+ ~(0) = 0 . Be Lemma 2.6, {X n,~rn}ncD

Next, suppose only that {Xn'~n}nE D

are non-negative a~-rts. From what has been shown so far, it

follows that that Since

{~(X~),~n}nC D

{~l(Xn),Srn}nC D ~(X)

and

and

is an amart, where

= ~(X~) + ~l(Xn)

{~(Xn) ' ~ } n C D Finally,

(because

are amarts and thus a l s o

~l(X) ffi~(-x) ~(0) = O)

for all

x C R.

we conclude that

is an a m a r t .

if

{*(Xn)'~n}neD

{~(Xn),~n}nE D

~(0) ~ 0

we p u t

~ ( x ) = ~ ( x ) - ~ ( 0 ) . Then

is an amart and thus

{~(Xn) ,~n}neD

~(0)

= O,

is too.

This terminates the proof. Now, suppose that

~: R ~ R

is a function for which

hold. As pointed out in Bellow (1977) , sequence of real numbers

(5.1)

does not

page 286 one can always find a

{an} , which is an amart and such that

{~(an)}

is not. We therefore turn to the problem of finding what additional assumptions on the amart are needed (together with Theorem 5.1 to remain valid when Theorem 5.3. Let

{Xn'~n}nED

tinuous functions such that

(5.2)

(5.1)) for the conclusion of

no longer holds.

be an amart and let lim q0(x) x x-++~

and

~0: R-~ R

be a con-

lim q~(x) do not exist x x-~ - ~o

(finitely).

(a)

D =N. Assume in addition that {~(XT)}TC T

{Xn}nE N

is

Ll-bounded and that

is uniformly integrable. Then, {~(Xn),~n}nE N

is an

Ll-bounded amart.

(b)

D =-N. Assume further that {~(Xn)'Yn}nE-N

{~(Xn)'~n}nE-N

is a semiamart. Then,

is an amart.

Proof. The amart convergence theorem and the continuity of imply that

~(Xn)

converges a.s. as

n ~ ~

(n ~ - ~ )

~

. The conclusion now

follows immediately from Theorem 3.10 and Corollary 3.11. Remark 5.4. After reduction to the case

X

together

> O , ~(0) = O n--

and

38

lim x-l-to(x) = 0 x ~ +~ validity of (5.4)

the proof of Theorem 5.1 consisted of s h o ~ n g the and

(5.5)

above. In the present theorem the corre-

sponding properties are ~ p p o s e d to hold. However, following these remarks, some examples are presented to show that the theorem is (essentially) the best possible. Remark 5.5. D =N. It is easily seen by an estimate related to those used to show

(5.4)

and

(5.5)

that the assumption that

{Xn}nE N

is

Ll-bounded can be dropped if

~I -- lim inf Ix-l.to(x)[ and u 2 = x -~+~ = lim inf Ix-l-to(x)l both are positive, because the Ll-boundedness then x-~-~ follows from the uniform integrability of {to(XT)}TC T . However, if

C~l = ~2 = 0 Let

this cannot be done as is seen by the following example:

{~n}nEN

be a sequence of i.i.d, random variables such that 1 n Y ~k and ~n = G{Xk; k < n}, P(~n = w) = P(~n=-W) = ~ . Put X n = k=l n=l,2,....

Then

ZiXnl ~ /~n

as

{Xn,Tn}nC N

n~--,

is a martingale (and hence an amart),

{ X } n £ N i s not

Ll-bounded. Now, choose

~I =(12 = O

lim suplx-l-to(x)I = i) .

i.e.

tO(x) = I x . sinxl , (for which

and

Ixl

- ®

Clearly, to(Xn) m O

for all

n,

in particular, {to(XT)}T E T

is uniformly

integrable. Remark 5.6. If one of the limits

lim X~

x-l-to(x)

and

--~

lim

x-l-to(x)

X~

exists, finite and the other does not, then, by considering the positive and negative parts separately, the assumptions on {to(Xn)}nC-N ' for

D =N

and

D =-N

{to(XT)}T E T

and

respectively, can be reduced to

assumptions on one part only, by applying Theorem 5.1 to the other part. Similarly, if e.g.

~i > 0

and

~2 = 0,

where

~I

and

~2

are defined

as in Remark 5.5. As an example, consider x

if

x ~ 0

if

x < 0 .

to(x) = Then, f o r

D=N,

if

{Xn,~n}nE N i s an amart, {to(Xn),~n}nC N i s an

39

Ll-bounded amart, provided

{Xn}ne N

is

Ll-bounded and

{(X~)2}Te T

is

uniformly integrable. In the remainder of this section we use the examples from Section 4 to produce the examples that were promised at the end of Remark 5.4. First, let

D =N .

Suppose that the assumption that is replaced by the assumption that

{~(XT)}T £ T

{~(Xn)}n E N

is uniformly integrable

is uniformly integrable and

consider Example 4.3 together with the function ~(x) = Ixlp , p > 1 . Then, {X (p) ~ P ) } n ' n n£N

(with

p > I)

is an

~(X~ p)) = X(1)n it follows that that

{~(X~p)) ,~nP)}nqN

{~(Xn)}n E N

Ll-bounded amart. Further, since

{~(x~P))}n6 N

is uniformly integrable and

fails to be an amart. The condition that

is uniformly integrable is thus not sufficient for Theorem 5.3

to hold in general (if

D =N) .

Next, consider a possible replacement with the assumption that {~(Xn)'~rn}nq N

is an

Ll-bounded semlamart (or, equivalently, that

{~(x)}~ £ T is Ll-bounded) and apply Example 4.2 together with the function ~(x) ~ [ x l P ,

and

~Y(P) p > 1 . Then, ~ - n "~nP ) ~" n e N

{,~,cx(P)~n "'~P)}nn EN

is an

(p > I)

Ll-bounded ~m~rt

Ll-bounded semiamart but not an amart.

Note that, since none of the conditions integrable" and "{~(XT)} T E T

is an

is

Example 4.1 and Example 4.3 with

"{~(Xn)}n 6 N

is uniformly

Ll-bounded'' imply each other (combine 1/2 < p < i) both conditions had to be

investigated. Now, let

D=-N.

Suppose that the assumption that

{~0(Xn),~n}nE_N

weakened (cf. Theorem 2.12) to the assumption that

is a semiamart is

{~0(Xn)}nC_N

is uni-

formly integrable and consider Example 4.6 together with the function ~0(x) -- Ix[p , p > i. Then, ^'X p) } ~ n ~ nE-N an amart.

;X (p) ~ P ) } n 'n n6-N'

is uniformly integrable but

where

p > i

is an ~m~rt,

{~P(Xn(P)),~P)} n n6-N

is not

6~The

Riesz decomposition

The Riesz decomposition theorem for amarts was first proved in Edgar and Sucheston (1976 a), Theorem 3.2 for the case

D=N

and, independently,

in Krengel and Sucheston (19781 (except for the problem of uniqueness) and Gut (1982) ,

Theorem 6.1 for the case

of semi~m~rts,

D =-N.

For the Riesz decomposition

see Ghoussoub and Sucheston (1978) and Krengel and Sucheston

(1978). We consider amarts only. First, let

D = N . Instead of presenting the

original proof we use the following lemma from Astbury (1978), where a Riesz decomposition theorem for amarts indexed by directed sets was proved. Lemma 6.1. Let T0 6 T

{Xn'grn}nCN

be an smart and let

E > O . Then there exists

such that

zlx~ - S ~'~XoI

(6.1) Consequently,

the net

~E

for

(E~XT)T C T

~ > T > TO .

converges in

LI

for any

~ E T.

Remark 6.2. Here we have used net convergence in a more general form than described in Section 2. For details, see Neveu (19751, page 96. Proof. Since the net (6.2)

(EXT)T £ T

IEX 0 - E X a l ~ ~/2 Let

T E T,

T O < T < ~, T

p = where

converges we can choose for all

~, O ~ T

TO C T

such that

O-

and define

on

A

on

AC

A £ ~T" It follows from

(6.2)

that

IE I{A} (X T - EgrTxG) 1 = 1E I{A}XT -E I{A}Xffl =

= IE (I{A)XT + I{Ac}X~) -E(IfAC}x~÷ I{A}X~)I = ZEX~- EXal ~ E/2. Set

A = {X T - E ~ X ~

O} . Then, by applying the previous inequality

41 to the sets

A

and

E IXT-E which proves

A c , we obtain

"Xol = E I { A } ( X T - E

(6.1).

As to the second conclusion of the l e m m a w e use that for

~

T, TO, P £ T T -E

which, since

< E,

Xo)- EI{AC}(x T - E ~ X O )

LI

such that

(6.1)

to observe

~ > • > TO, p

X~I =EIETO(XT - E

XG) I e E IXT -

XO

_ E ,

is complete, completes the proof.

We are now ready to state and prove the Riesz decomposition theorem. Theorem 6.3. Let written as {Zn'%}n£N and in

be an amart. Then

Xn = Yn + Zn " where is a

{Yn'~rn}n£N

X

n

(E~OXT)T £ T

is a martingale and

T-uniformly integrable amart, such that

p 6 T

Zn ~ O

a.s.

be arbitrary. It follows from Lemm~ 6.1 that the net

converges in

LI

e > 0 , there exists

(6.3)

to TO

E[Yo -E~0XTI < e

YO ' say. In particular this implies that, such that

for all

T > T 0.

Our next goal is to show that for

p E T,

(6.4)

O £ T , such that

Let

can be uniquely

LI .

Proof. Let

given

{Xn'~n}n6N

Y 0 < p < T

= E vY and

EIYa-

O

for all

T ~ TO.

In view of

eEIYo - E XTI + E I E

fixed,

(6.3)

XT -

~ < 0-

we obtain

01 =

= EIY-E~r~XTI + m IE~(E ~0XT-yp) I ~ e + E I E ~-OXT-YoI ~ 2e, from which

(6.4)

follows because of the arbitrariness of

We have thus e s t a b l i s h e d

that

{Y ' ~ " } n E N n n

g.

is a martingale.

42

. Since (~-%'Zn"n~n£ N is the n difference of two amarts it is itself an amart. Next, given e choose T O To complete the proof, set

and

c > r > TO

that

such that

EIYT- EYTXGI ~ e

Zn = X n - Y

(6.1)

is satisfied for

and such

(ZT)T£T

(cf. (6.3)). Then, since

E~TZ = E~(X

-Y~) = EYTX -yT

we obtain

ZlZTI'I IZTI> }_<EIZ I_<EIZ-E ZoI +zlE Xo-Y I_<2 which proves that

{ZT}T q T

is uniformly integrable.

To show uniqueness, suppose that Then

{[y~l) -Y(2)In ' ~ n } n E N

X n = y(1)n + g(1)n = y(2)n + Z(2)n "

is a submartingale, in particular

EIY~ I)-Y(2) I increases with

n.

However,

EIY~ I)-Y(2) 1 = E Z (1)-z(2) I <

n

n

< EIZ~I) I + EIZ~2) I " O

as

n ""

and consequently

n

n

y(1) = y(2)

a.s.

--

n

for all

for all

n.

Therefore,

Z (I) = Z (2) n

a.s.

for all

n

n

and the theorem

n

is proved. We now turn to the case Let

{Xn'Yn}n£ -N

theory that

D = -N.

be an amart. It is well known from martingale

{E~n X-I'~n}nE-N

is a uniformly integrable martingale and

thus that it converges a.s. and in theory we know that n

-~-~+

(6.5)

n ~ - ~ • Also, from amart

converges a.s. and in

LI

to

X _ ~ , say, as

n C -N,

y n

Since

(6.6)

as

.

Set, for

for all

Xn

LI

. ~ n X_I + X_oo- E

X_oo and

n E -N,

E

X_I

are

X_I

n

Yn =

Zn = X n - Y n "

~r -measurable, i.e. ~--measurable n

can also be written as

Y

and

EJn(X_I+X_~-E ~-= X_l ) .

--

43 It follows that is an amart. Also, Z

n

~

0

a.s.

and

{Yn'~n}nE-N {ZT}T C T

in

L1

as

is a martingale and that

{Zn'~n}nE-N

is uniformly integrable by Theorem 2.12 and n ~

~

The following theorem is thus obtained. Theorem 6.4. D = -N . Let written as

{Xn'~n}nC-N

X n = Y n + Z n , where

{Zn'~n}n C -N

(Yn,~n}nE_N

is an amart such that

and (automatically) such that

be an amart. Then

Z

~ 0

n

{ZT}~ C T

The proof of the uniqueness when

Xn

is a martingale and a.s.

and in

LI

D = -N

as

n~-~

is uniformly integrable.

D = N

is essentially based upon the

fact that there are no non-trivial martingales that converge to When

can be

0

in

LI •

this is no longer the case and the following example shows

that there need not be uniqueness (cf. Gut (1982), Section 6). Example 6.5. Consider Example 3.15 with

I < r < 2 . The following decompo-

sitions are possible: X

=O+X -n

-n n

x

Since

1

-n = ~

{Xn'~n}nC-N

Z Ek + (X-n-

k=l

n

E 5k).

k=l

is an smart which satisfies the properties of the

"potential part", the first decomposition is obvious. For the second one, n

set

Y-n = n-I

martingale, Yn

Z ~k " Then, {Yn,~n}n£_N is a uniformly integrable k=l O a.s. and in L I as n ~ - m and X -n - Y -n is an

amart that has the properties of the "potential part" as described in the theorem.

7.

Two further ~eneralizations

of martingales

In this last section we shall briefly mention two further generalizations of the martingale concept. The main reason for brevity is that, as will be seen below, there are several negative results; viz. there are several properties which hold for amarts hut fail to hold for these other concepts (see Edgar and Sucheston (1977 a) and Bellow and Dvoretzky (1980)). Throughout

D =N .

Definition 7.1. An adapted process,

~ t h time

if and only if for every

P(IE~rmXn - Xml >E) ~ 0

{Xn} n C N ' is called

a game fairer

e > 0

as

n,m ~--

with

n ~ m.

Games which become fairer with time were introduced in Blake (1970). Later Muccl (1973) and Subr~m~nian (1973) (independently) formly integrable games fairer with time converge in

proved that uni-

L I . The idea of the

proof in Subr~msuian (1973) is to show that the sequence converges in

LI

to

Ym'

say, for every

Riesz decomposition theorems), that martingale, which hence converges in 3E-argument that

X

n

converges in

m

(just as in the proof of

{Yn'~rn}n £ N LI LI

to to

{E m X n } n £ N

is a uniformly integrable

Y , say, and finally, by a Y .

It is immediate from the definition of a martingale that

every

martingale is a game fairer with time. Further, it is shown by Edgar and every

Sucheston (1976 e) that

time

(real valued)

amamt is a game fairer with

(but not necessarily vice versa). Mucci (1973) also introduces the concept of a martingale in the limit

as follows. Definition 7.2. An adapted process, {Xn} n C N ' is called a

the limit

martingale in

(m.i.l) if and only if

E~mx

- X n

~ 0 m

a.e.

as

n,m ~

with

n > m.

45

It is clear from the definitions that every martingale is a and that every

m.i.l,

m.i.l.

is a game fairer with time. Further, Blake (1978)

and Edgar and Sucheston (1977 a) show that

e~ePyumuPt is a mc~ti~gule in

the limit. Further, Mucci (1976) proves that every

Ll-bounded

m.i.l.

converges almost surely. Since amarts and martingales in the limit both considerably generalize the notion of amartingale, ing a

one is naturally led to the problem of develop-

m.i.1.-theory just as has been done for amarts. We have, for example,

noticed above that some kind of convergence theorems remain valid. However, it turns out that there areseveral other basic and useful properties which hold for martingales and amarts which do not hold for martingales in the limit (and games which become fairer with time), such as the maximal ineuqality,

the Riesz decomposition theorem. For details,

see Edgar and

Sucheston (1977 a) and Bellow and Dvoretzky (1980). See also Blake (1981). For other generalizations of martingales and amarts we refer to the references given in the third part of this volume.

References: Astbury, K., (1978), Amarts indexed by directed sets. Ann. Probability 6, 267-278. Austin, D.G., Edgar, G.A., and lonescu Tulcea, A., (1974), Pointwlse convergence in terms of expectations. Z. Wahrscheinlichkeitstheorie verw. Gebiete 30, 17-26. Baxter, J.R., (1974), Pointwise in terms of weak convergence. Proc. Amer. Math. Soc. 46, 395-398. Bellow, A., (1976a), On vector-valued asymptotic martingales. Proc. Nat. Acad. Sci., U.S.A. 73, 1798-1799. Bellow, A., (1976b), Stability properties of the class of asymptotic martingales. Bull. Amer. Math. Soc. 82, 338-340. Bellow, A., (1977), Several stability properties of the class of asymptotic martingales. Z. Wahrscheinlichkeitstheorie verw. Gebiete 37, 275-290. Bellow, A., (1978), Some aspects of the theory of vector-valued amarts. Springer Lecture Notes inMathematics 644, Springer, Berlin, 57-67. Bellow, A. and Dvoretzky, A., (1980), On martingales in the limit. Ann. Probability 8, 602-606. Billingsley, P., (1979), Probability and measure. Wiley, New York. Blackwell, D. and Duhins, L.E., (1963), A converse to the dominated convergence theorem. Illinois J. Math. 7, 508-514. Blake, L.H., (1970), A generalization of martingales and two consequent convergence theorems. Pacific J. Math. 35, 279-283. Blake, L.H., (1978), Every smart is a martingale in the limit. J. London Math. Soc. 18, 381-384. Blake, L.H., (1981), Tempered processes and a Riesz decomposition for some martingales in the limit. Glasgow Math. J. 22, 9-17. Brunel, A. and Sucheston, L., (1976), Sur les smarts faibles ~ valeurs vectorielles. C.R. Acad. Sci. Paris, S~r. A 282, 1011-1014.

47

Brunel, A. and Sucheston, L., (1977), Une caract~risation probabiliste de la s~parabilit~ du dual d'un espace de Banach. C.R. Acad. Sci. Paris, S~r. A 284, 1469-1472. Chacon, R.V., (1974), A"stoppe~'proof of convergence. Adv. in Math. 14, 365-368. Chacon, R.V. and Sucheston, L., (1975), On convergence of vector-valued asymptotic martingales. Z. Wahrscheinlichkeitstheorie verw. Gebiete 33, 55-59. Chen, R., (1976a), A simple proof of a theorem of Chacon. Proc. Amer. Math. Soc. 60, 273-275. Chen. R., (1976b), Some inequalities for randomly stopped variables with applications to pointwise convergence. Z. Wahrscheinlichkeitstheorie verw. Gebiete 36, 75-83. Doob, J.L., (1953), Stochastic processes. Wiley, New York. Edgar, G.A. and Sucheston, L., (1976a), Amarts: A class of asymptotic martingales. A. Discrete parameter. J. Multivariate Anal. 6, 193-221. Edgar, G.A. and Sucheston, L., (1976b), Amarts: A class of asymptotic martingales. B. Continuous parameter. J. Multivariate Anal. 6, 572-591. Edgar, G.A. and Sucheston, L., (1976c), Les amarts: Une classe de martingales asymptotiques. C.R. Acad. Sci. Paris, S~r. A 282, 715-718. Edgar, G.A. and Sucheston, L., (1976d), The Riesz decomposition for vectorvalued amarts. Bull. Amer. Math. Soc. 82, 632-634. Edgar, G.A. and Sucheston, L., (1976e), The Riesz decomposition for vectorvalued amarts. Z. Wahrscheinlichkeitstheorie verw. Gebiete 36, 85-92. Edgar, G.A. and Sucheston, L., (1977a), Martingales in the limit and amarts. Proc. Amer. Math. Soc. 67, 315-320. Edgar, G.A. and Sucheston, L., (1977b), On vector-valued amarts and dimension of Banach spaces. Z. Wahrscheinlichkeitstheorie verw. Gebiete 39, 213-216.

48

Fisk, D.L., (1965), Quasi-martlngales. Trans. Amer. Math. Soc. 120, 369-389. Ghoussoub, N. and Sucheston, L., (1978), A refinement of the Riesz decomposition for amarts and semiamarts. J. Multivariate Anal. 8, 146-150. Gut, A., (1979), Moments of the maximum of normed partial sums of random variables with multidimensional indices. Z. Wahrscheinlichkeitstheorie verw. Gebiete 46, 205-220. Gut, A., (1982), A contribution to the theory of asymptotic martingales. Glasgow Math. J. 23, 177-186. Klass, M.J., (1974), On stopping rules and the expected supremum of Sn/a n

and

ISnl/a n . Ann. Probability 2, 899-905.

Krengel, U. and Sucheston, L., (1978), On semiamarts, amarts and processes with finite value. Advances in Prob. 4, 197-266. Lo~ve, M., (1963), Probability theory, 3rd ed., Van Nostrand, Princeton. Mertens, J.F., (1972), Th~orie des processus stochastiques g~n~raux; applications aux surmartingales. Z. Wahrscheinlichkeltstheorie verw. Gebiete 22, 45-68. Meyer, P.A., (1966), Probabilit~s et Potentiel. Paris, Hermann. Meyer, P.A., (1971), Le retournement du temps, d'apr~s Chung et Walsh. S~minaire de probabilit~s V, Lecture Notes in Math. 191, SpringerVerlag, Berlin, 213-236. Mucci, A.G., (1973), Limits for martlngale-like sequences. Pacific J. Math. 48, 197-202. Mucci, A.G., (1976), Another martingale convergence theorem. Pacific J. Math. 64, 539-541. Neveu, J., (1975), Discrete parameter martingales. North-Holland Publ. Co. Orey, S., (1967), F-processes. Proc. 5th Berkeley Symposium on Math. Stat. and Prob., Vol. If.l, 301-313. Rao, K.M., (1969), Quasi-martingales. Math. Scand. 24, 79-92.

49

Rao, M., (1970), On modlfication theorems. Preprint, Arhus univ. Subramanian, R., (1973), On a generalization of martingales due to Blake. Pacific J. Math. 48, 275-278. Sudderth, W., (1971), A "Fatou equation" for randomly stopped variables. Ann. Math. Statist. 42, 2143-2146.

Klaus

D.

A m a r t s

a

Schmidt:

-

m e a s u r e

t h e o r e t i c

a p p r o a c h

I-'-

,¢

I-'-

0

C o n t e n t s

I.

Introduction

2.

Real

2.1.

Measures

2.2.

Set

2.3.

Martingales

.

amarts

55

... . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . .

61

.... .............

function

processes

.... .........

...........

............................

.......................................

2.4.

Submartingales

2.5.

Amarts

and

quasimartingales

...............

............................................

2.6.

Semiamarts

2.7.

Remarks

3.

Amarts

in

3.1 o

Vector

measures

3.2.

Set

3.3.

Martingales

.... ....................................

Strong

3.5.

Uniform

3.6.

Weak

62 69 74 81 89 106 112

a

123

Banach

..........................

................................... .................

, ..........

125 136

.......................................

142

.....................................

145

....................................

149

amarts

amarts,

space

processes

amarts

weak

.

...........................................

function

3.4.

and

......................................

un{form

sequential

weak amarts

amarts, ........................

157

...........................................

165

a

167

3.7.

Remarks

4.

Amarts

in

4.1.

Vector

measures

4.2.

Set

function

Banach

lattice

........................

...................

processes

... . . . . . . . . . . . . .

................

............

169 177

54

4.3.

Submartingales

4.4.

Uniform

4.5.

Weak

4.6.

Order

4.7.

Remarks

5.

Further

amarts

amarts

and

amarts

and

positive

positive

strong

weak

potentials

potentials

.....

..........

......................................

...........................................

aspects

A~endix

of

on Banach

References

Index

....................................

amart

193 196 200 207

...................

211

.......................

215

theory

lattices

179

........................................

.............................................

217

233

I.

I n t r o d u c t i o n

It is the i n t e n t i o n approach

of these notes

to p r e s e n t

to the t h e o r y of a m a r t s w h i c h

integers.

This m e a n s

set f u n c t i o n s than amarts

that we shall

which

stochastic

processes.

This m e a s u r e

form the natural

theoretic

by the very d e f i n i t i o n of s t o p p e d

approach

r a n d o m variables,

role p l a y e d by m e a s u r e

by p a s s i n g

arguments

Radon-Nikodym

derivatives set f u n c t i o n

then p o s s i b l e stochastic

suitable

conditions

to p r o v e p o i n t w i s e

process.

or g e n e r a l i z a t i o n s

for a m a r t s

of r a n d o m variables.

There

is also a h i s t o r i c a l

approach

to amarts.

originated

While

suggested

on the set f u n c t i o n

in f a v o u r

the general

from the p a p e r s by Austin,

methods. to their

a stochastic process,

it is

theorems

for the induced

obtained

in this way are

convergence

of the m e a s u r e

theory of a m a r t s Edgar,

theory

to the u n d e r l y i n g

induces

of the w e l l - k n o w n

argument

of

the structure

set f u n c t i o n s

respect

theorems

of a net

by the i m p o r t a n t

theoretical

process

convergence

The c o n v e r g e n c e

equivalents

with

to

in the i n v e s t i g a t i o n

additive

measure,

Under

counterpart

is c e r t a i n l y

processes,

by p u r e l y m e a s u r e

probability process.

theoretical

and it is a l s o m o t i v a t e d

generalized

rather

of set f u n c t i o n

in terms of the e x p e c t a t i o n s

from b o u n d e d

each

derivatives,

and their expectations.

in the p r o p e r t i e s

of set f u n c t i o n

of amarts c a n be d e v e l o p e d Furthermore,

Radon-Nikodym

measure

theoretical

In the f r a m e w o r k

of b o u n d e d a d d i t i v e

to a m a r t t h e o r y

of amarts

theoretic

are i n d e x e d by the p o s i t i v e

random variables

we will be i n t e r e s t e d

processes,

a measure

study a m a r t s

and their g e n e r a l i z e d

of i n t e g r a b l e

More generally,

amarts.

.

theorems

theoretic

of r a n d o m v a r i a b l e s

and Ionescu

Tulcea

[3] and

56

Chacon

[32] in 1974, amarts of set functions had been studied earlier,

by C h a t t e r j i

[35] in 1971, and by Lamb

[90] in 1973. A l t h o u g h C h a t t e r j i ' s

c o n d i t i o n on a set f u n c t i o n process as well as Lamb's d e f i n i t i o n of an a p p r o x i m a t e m a r t i n g a l e are f o r m u l a t e d w i t h o u t

(explicit)

use of stopping

times, they can easily be seen to be e q u i v a l e n t to the amart condition.

In the literature,

the theory of m a r t i n g a l e s and their g e n e r a l i z a t i o n s

was from an early stage on a c c o m p a n i e d by the i n v e s t i g a t i o n of set f u n c t i o n processes. A m o n g the m o s t i n t e r e s t i n g papers on this topic are those by A n d e r s e n and Jessen 1955, J o h a n s e n and K a r u s h Chatterji Lamb

[35,36,37]

[1,2] in 1946 and 1948, Bochner

[85,86]

in 1971,

in 1963 and 1966, Uhl

1973, and 1976, Rao

[22] in

[128] in 1969,

[107] in 1971, and

[90] in 1973. Most of these authors c o n s i d e r e d c o u n t a b l y a d d i t i v e

set f u n c t i o n processes. studied by B o c h n e r

F i n i t e l y a d d i t i v e set f u n c t i o n p r o c e s s e s were

[22], C h a t t e r j i

[35,36,37], and Schmidt

For the reasons of s i m p l i c i t y and generality,

[111-118].

the finitely a d d i t i v e case

seems to be the really i n t e r e s t i n g one and will be studied in these notes.

The i n v e s t i g a t i o n of p o i n t w i s e c o n v e r g e n c e of stochastic p r o c e s s e s in the f r a m e w o r k of set f u n c t i o n p r o c e s s e s

is m a r k e d by two f u n d a m e n t a l

ideas w h i c h have their origin in the work of A n d e r s e n and J e s s e n

[1,2].

The first of these ideas is to c o n s t r u c t a g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e for b o u n d e d a d d i t i v e set functions w h i c h need not be a b s o l u t e l y c o n t i n u o u s w i t h r e s p e c t to the u n d e r l y i n g p r o b a b i l i t y measure, and to study the p o i n t w i s e c o n v e r g e n c e of the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s of a set f u n c t i o n process.

The second idea is to identify

the limit of the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s of a set function process w i t h the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e of the limit of the set f u n c t i o n process.

In a sense, the first idea is a c o n s e q u e n c e

of the second one: Even in the case of a set f u n c t i o n process w h i c h results from i n t e g r a t i n g a stochastic process,

the limit m e a s u r e may

possess a n o n t r i v i a l singular part, and in this s i t u a t i o n the idea of i d e n t i f y i n g the limit of the stochastic process e n f o r c e s the c o n s i d e r a t i o n of the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e of the limit of the set f u n c t i o n process.

It is then natural to g e n e r a l i z e one step further,

and to study the p o i n t w i s e c o n v e r g e n c e of the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s of a general set f u n c t i o n process w h i c h n e e d not result from i n t e g r a t i n g a stochastic process. c o n c e r n e d real martingales,

The w o r k of A n d e r s e n and J e s s e n

and it was e x t e n d e d to submartingales,

amarts, and v e c t o r - v a l u e d p r o c e s s e s by J o h a n s e n and K a r u s h Chatterji

[35,36,37], Lamb

and others.

[1,2]

[90], Rao

[107], Schmidt

[85,86],

[113,116,117,118],

57

For f i n i t e l y derivative

additive

was first c o n s t r u c t e d

the p r o b l e m

to the c o u n t a b l y

decomposition. construction

lattice

the g e n e r a l i z e d

Radon-Nikodym

:

with

its g e n e r a l i z e d

the c l a s s i c a l lattice

Radon-Nikodym

the theory

of set f u n c t i o n

consider

By T h e o r e m vector

lattice.

the class

Therefore,

amar t of set functions. derivatives

of

Radon-Nikodym

~v ~

and it follows

=

methods

b a s e d on the d i f f e r e n c e Fatou-Chacon-Edgar

and S u c h e s t o n Riesz

[18,19].

[33]

decomposition

and in d e d u c i n g inequality.

for amarts

For p r o v i n g

Radon-Nikodym

derivatives

X v Y

Bv~

Y

and

~

.

is a

Radon-Nikodym

, the g e n e r a l i z e d

converges

we have

a.e.

theorem,

and an i n e q u a l i t y

of the

[64], and

introduced

It c o n s i s t s

of the p o t e n t i a l

is

[32], and it

[54], E g g h e

m e t h o d was

by C h a c o n

in p r o v i n g

and a p o t e n t i a l

a

part,

part from a m a x i m a l

for the g e n e r a l i z e d

of an a m a r t of set functions,

.

is a b o u n d e d

n 6~

is due to C h a c o n

theorems

and

One of these m e t h o d s

case:

of

,

into a m a r t i n g a l e

convergence

~

the a m a r t c o n v e r g e n c e

in the v e c t o r - v a l u e d

the c o n v e r g e n c e

X

lattice h o m o m o r p h i s m ,

by E d g a r

A different

applicability

the g e n e r a l i z e d

ones.

vector

of the

of set f u n c t i o n s

for all

of

processes.

process

for amarts

further

a wide

amarts

process

This a p p r o a c h

been d e v e l o p e d

B e l l o w and E g g h e

continuous)

. This p r o p e r t y

D n ( B n v ~n )

interesting

property

type.

Since,

for p r o v i n g

there are two p a r t i c u l a r l y

has r e c e n t l y

=

extension

of set functions,

2.5.14,

is a v e c t o r

D n B n v Dn~ n

on the a l g e b r a

of r a n d o m variables,

amarts

that the s t o c h a s t i c

the v a r i o u s

(necessarily

the set f u n c t i o n

Dn

operator

is the u n i q u e

to stochastic

amarts

a.e.

of

transparent.

set f u n c t i o n

guarantees

By C o r o l l a r y

the

is b a s e d

the p r o p e r t i e s

Radon-Nikodym

ba(F, ~)

of all b o u n d e d

converge

operator

X n v Yn

Among

bounded

we o b t a i n b o u n d e d

2.5.3,

to a

processes

in w h i c h

,

of

operator

derivative

also b e c o m e

additive

operator

direct

This c o n s t r u c t i o n

derivative,

on the w h o l e

who r e d u c e d

the Y o s i d a - H e w i t t

a more

from w h i c h

derivative

each b o u n d e d

generalized

By integration,

arguments

• LI(~, ~)

Radon-Nikodym

As an example,

Radon-Nikodym

Radon-Nikodym

homomorphism

present

that the g e n e r a l i z e d

ba(F, ~)

which associates F

we shall

Radon-Nikodym

[35,36]

case by u s i n g

is not needed.

theoretical

In fact, we shall p r o v e

D

by C h a t t e r j i

of the g e n e r a l i z e d decomposition

the g e n e r a l i z e d

additive

In these notes,

Yosida-Hewitt on v e c t o r

set functions,

this m e t h o d

58

seems

to be the a p p r o p r i a t e

Another

a s p e c t of a m a r t

between

the p r o p e r t i e s

and the p r o p e r t i e s For example,

one and will be used

theory

is the c l o s e

of a m a r t s

respectively,

and these c h a r a c t e r i z a t i o n s

More precisely,

certain

can be c h a r a c t e r i z e d for amarts between first

certain

of B a n a c h which

classes

clarify

the r e l a t i o n s

The m e a s u r e

authors

these n o t e s

between

In the f o l l o w i n g

aspects Amart

set f u n c t i o n

chapters,

of these c h a p t e r s

set f u n c t i o n s processes. aspects

Throughout of B a n a c h

will

we shall

be d e v o t e d

processes

of set f u n c t i o n

of rather e l e m e n t a r y

of amart

theory w h i c h

these notes,

theory a c t u a l l y

we shall

Banach

lattices

theory,

lattice.

set f u n c t i o n

amarts

The f i r s t

sections

processes the analysis.

in a

section

of each

discussion

contain

of

all results

in the i n v e s t i g a t i o n

on

of set f u n c t i o n

indicate

some further

the scope of these notes.

frequently

apply

information

results

on B a n a c h

Some d e f i n i t i o n s

may a l s o b e f o u n d

at the end of these notes.

to show in

and f u n c t i o n a l

we shall b r i e f l y

[109].

stimulated

and we hope

serve as a link b e t w e e n

are b e y o n d

For detailed

theory b u t c e r t a i n l y

to a rather d e t a i l e d

These

w h i c h will be n e e d e d

to the b o o k by S c h a e f e r

latti c e s

characterizations

study real amarts,

in a B a n a c h

set functions.

lattices.

of specific

type

in the f r a m e w o r k

properties number

processes,

measure

In the final chapter,

of a m a r t

several

various

of the

to amarts may be looked at as a p o i n t

certain

processes,

and a m a r t s

additive

relation

those of the s e c o n d

in the c o n t e x t of a m a r t theory,

t h e o r y of s t o c h a s t i c

bounded

of a subset

in terms of set f u n c t i o n

only a l i m i t e d

its full variety. to study

that,

space,

lattices

theorem

the c h a r a c t e r i z a t i o n s

include

lattices

ones

operators.

and B a n a c h

of a c o n v e r g e n c e

ones,

into their own r i g h t and m a y also

Banach

spaces

summing

and can be o b t a i n e d

We shall

approach

enlightens

encompass

several

While

can be

in t h e i r proofs.

theoretic

of v i e w w h i c h cannot

involve

nature

itself.

to c o r r e s p o n d i n g

or by the v a l i d i t y

probabilistic

processes.

and w h i c h

of B a n a c h

of amarts.

theoretical

counterexamples

refer

class,

spaces and B a n a c h

processes

extend

lattice

strong p o t e n t i a l s ,

and cone a b s o l u t e l y

properties

type are t y p i c a l l y

of set f u n c t i o n

and p o s i t i v e

e i t h e r by the v a l i d i t y

of a c e r t a i n

have a m e a s u r e

come

operators

lattice

spaces and A L - s p a c e s

in terms of strong a m a r t s

summing

existing

space orl B a n a c h

space or B a n a c h Banach

characterized

for a b s o l u t e l y

relationship

in a B a n a c h

of the B a n a c h

finite d i m e n s i o n a l

in these notes.

of the t h e o r y

lattices,

we

and properties

in the a p p e n d i x

on B a n a c h

59

Let

us n o w

Let

~

their then

fix

be

a set.

union its

some

will

Let

F

be an

F(A)

mutually

A

and

in

algebra

::

~

B

be

•

~

{ B6

sets

A + B

will

on

F

used

subsets

is a s u b s e t

A

denoted

by

will

each

I B c_ A

}

finite

throughout

. If

{0,1}

F(A)

be

disjoint

. For

A

in

will

are

by

~

is a n a l g e b r a .

disjoint

which

denoted

function

F(A)

Then

If be

complement

characteristic

notation

Ac

be

set

of

or

denoted

these

~

, then

of

~A

notes.

~

,

, and

by

XA

its

.

A £ F , define

collection

{AI,A2,...,Ak}

is a p a r t i t i o n

of

A

in

of

F

if

it

satisfies k l i=I Let

P(A)

P(A)

A

=

denote

the

is d i r e c t e d

F-measurable

A

1 class

upward

simple

of

in

all

the

function

if

partitions

obvious it c a n

way.

of

A

A map

be written

in g

in

F . The

: ~ the

> ]R

class is a n

form

k g

where are

scalars.

functions. vector

which

With

lattice

AM-space

An

with

be

unit

called

[

F

be

unit X~

of

Q

in

F

and

~I'

~2'

X~

, and

its

. Following each

set

universal

{ Fn

~

sup-norm

Graves

A 6 F

vector

a stochastic

:=

is a n

I n 6~

will

U n £~ algebra

"'''

~k

]) d e n o t e t h e c l a s s of a l l F - m e a s u r a b l e simple o to t h e s u p - n o r m , t h e c l a s s D o is a n M - n o r m e d

its

[79],

completion the

map

characteristic

measure

on

F

D X

be

: F

.

}

called

basis

on

Fn

on

~

.

a stochastic

~

. Define

basis

on

is a n

function

sequence

on

F F

the

,

is a p a r t i t i o n

Let

with

:=

of a l g e b r a s

Then

~iXA. l

respect with

associates

increasing

Let

Z i=1

{ A I , A 2 ..... A k} (real)

will

=

Q

.

• • XA

, ,

80

A map

T

: ~

> ~U

{T=p}

holds

f o r all

for

[

Let

, and

T

as w e l l

it is b o u n d e d

denote with

containing

F

time

for

F

if

if the v a l u e

~(~)

. Endowed

lattice

is a s t o p p i n g

6 Fp

p 6~

sup~

is finite.

{~}

~

:=

the c l a s s

of all b o u n d e d

the p o i n t w i s e

defined

. For each bounded

{ A£

F

I A n { T = p } 6 Fp

stopping

order,

times

the c l a s s

stopping

time

for all

p6~

T

T 6 T

}

is a

, define

,

as

l~(r)

:=

{ n q]N

[ T < n )

T(T)

:=

{ (~£T

I T < c }

and .

Then F is an a l g e b r a on ~ , and T(T) T For a stopping time T £ T U {~} a n d a set FT(A) and

and

PT(A)

in the

o 6 T(~) U {~}

Almost

all

on a p a r t i c u l a r define,

n 6~

K(n)

:=

Now define

~

algebra

[0,1)

on

:=

Bn, k

k 6 K(n) standard

. The

stochastic

basis

and,

which

we

• £ T

and

PT(A)

processes

shall

,

will

construct

A 6 FT

~ Pa(A)

be b a s e d now.

First

.

for all

n 6~

is g e n e r a t e d

basis

it w i l l

basis

~

on

[0,I)

:= { F n

set.

F

n

to be

the

sets

,

I n 6~

}

will

be c a l l e d

.

a l s o be c o n v e n i e n t

on a o n e - p o i n t

, define

b y the

[ ( k - l ) 2 - n , k 2 -n)

stochastic

basis

Fa(A)

set f u n c t i o n

{I ,2,... ,2 n}

which

:=

Fr(A ) ~

~(T)

the classes

,

[0,1)

stochastic

In some c a s e s ,

concerning

stochastic

for all

have

containing

, define

T F o r all

same w a y as above.

, we then

examples

is a l a t t i c e A £ F

to c o n s i d e r

the

trivial

the

2.

Real

The theory sense,

ama

r t s .

of real amarts

the b e s t p o s s i b l e

may be r e g a r d e d solution

of all b o u n d e d m a r t i n g a l e s pointwise

convergence

to a B a n a c h

obtains.

as a s a t i s f a c t o r y

lattice

This e x t e n s i o n

of p r o c e s s e s

and it is o n l y p a r t l y

submartingales

In the f r a m e w o r k

amarts

2.3),

of set f u n c t i o n structure

(Section

2.5).

on

derivative

(finitely

we shall

properties

and q u a s i m a r t i n g a l e s

The s t r u c t u r e

martingales

to

successively of m a r t i n g a l e s

(Section

t h e o r y of g e n e r a l i z e d results

measure.

process

We shall c o n c l u d e 2.7.

will be i n t r o d u c e d

additive)

measures

the c o n s t r u c t i o n

of a b o u n d e d

probability

Section

processes,

by some a d d i t i o n a l

processes

which also c o n t a i n s

function

from

fails to be

2.4),

and

martingales

on s e m i a m a r t s

in

2.6.

Set function results

solved by g e n e r a l i z i n g

and c o n v e r g e n c e

submartingales

will be c o m p l e m e n t e d Section

for w h i c h

or q u a s i m a r t i n g a l e s .

study the b a s i c (Section

usually

in some

the class

problem originates

the fact that the c l a s s of all b o u n d e d m a r t i n g a l e s a lattice,

and,

to the p r o b l e m of e x t e n d i n g

measure

with

The g e n e r a l i z e d

will be the o b j e c t

this c h a p t e r w i t h

in Section

2.2. The n e c e s s a r y

will be d e v e l o p e d

of the g e n e r a l i z e d respect

to a

(countably

Radon-Nikodym

2.1

additive)

derivatives

of all p o i n t w i s e

some remarks

in Section

Radon-Nikodym

of a set

convergence

and c o m p l e m e n t s

theorems.

in

2.1.

The

M e a s u r e s .

principal

generalized measure This

purpose

with

respect

construction

measures, measures norm.

which

to a

on an a l g e b r a

operator

the A L - s p a c e

F

with

additive)

on the L e b e s g u e

of all

each bounded

measure

extension

~(A+B)

=

> ~

~(A)

for e a c h p a i r

fact

the b o u n d e d

to the v a r i a t i o n

in p r o v i n g

its g e n e r a l i z e d

of the c l a s s i c a l vector

measure. for b o u n d e d

that

respect

additive)

that

the

Radon-Nikodym

Radon-Nikodym

lattice

homomorphism

on

measures.

on a set

: F

probability

also crucial

continuous)

bounded

be an a l g e b r a

~

with

are

of the

(finitely

decomposition

f r o m the

f o r m an A L - s p a c e

(necessarily

A set f u n c t i o n

holds

(countably

of A L - s p a c e s

is the u n i q u e

to a

is the c o n s t r u c t i o n of a b o u n d e d

is b a s e d

The properties

derivative

section

derivative

in t u r n c a n be d e d u c e d

map associating

Let

of this

Radon-Nikodym

~

.

is a d d i t i v e

if the

identity

+ ~(B}

of d i s j o i n t

sets

A,

B £ F , and

it is b o u n d e d

if

the v a l u e

suPF is finite. Let

with

In the

a(F, ~)

ba(F, ~ )

tit(A) i sequel,

denote

denote

these

2. I. I. The c l a s s

the c l a s s

the c l a s s

the p o i n t w i s e

order,

additive

defined

classes

are

set f u n c t i o n s

of all m e a s u r e s

of all b o u n d e d addition,

ordered

will F ....~

measures

in

multiplication

vector

by

be c a l l e d , and

scalars,

Lemma. ba(F, 3R)

is a v e c t o r

lattice,

a n d the

(~v~) (A)

=

suPF(A )

(~(B) +~0(A~B))

(~t^~) (A)

=

infF(A)

(B(B) + ~0(A~B) )

identities

and

hold

for all

~, ~ £ ba(F, ~ )

I

;

I~1 (~)

and

A £ F . Moreover,

let

a(F, ~ )

spaces.

the map

measures.

. Endowed and

63 is a l a t t i c e

Proof.

Then

~

n o r m on

Consider

B, ~ 6 ba(F, 3~)

~(A)

supF(A )

: F

:= > ]R

is a d d i t i v e , BE

F(A)

ba(F, ~ )

,

A £ F

B I := A I N B ~(B)

set

and

and

+ ~(A~B)

A £ F , define

(~(B) + ~(A~B))

is a b o u n d e d

fix

. F o r all

function.

B 2 := A 2 N B

=

In o r d e r

{ A I , A 2} £ P(A)

to see t h a t

. T h e n w e have,

for all

,

~(B I) + ~(AI~B I) + ~(B 2) + ~(A2~B 2) ~ ( A I ) + ~ ( A 2)

,

hence

~(A)

Conversely,

~

~ ( A I) + ~ ( A 2)

for all

C I £ F(A I)

,

,

C 2 E F(A 2)

~(C I) + ~ ( A I ~ C I) + ~ ( C 2)

and

+ ~ ( A 2 ~ C 2)

C

:= C I + C 2 , we h a v e

=

~(C)

<

~(A)

+ ~(A~C)

,

hence

~ ( A I) + ~ ( A 2) Therefore, least

identity. -~,

bound

The

-~£ba(F,

lattice, on

we h a v e

upper

and

~(A)

~ C ba(F, ~) of

B

second ~)

<

and

~

identity

and

~^~

it o b v i o u s

, and in

it is o b v i o u s ba(F, ~ )

follows

f r o m the

= -(-~)v(-~)

that

the m a p

is the the f i r s t

one because

ba(F, ~)

l~l(~)

~

proves

first

. Thus ~ ~ >

that

. This

of

is a v e c t o r

is a l a t t i c e

norm

ba(F, m )

L e t us r e m a r k

that

the v a r i a t i o n

norm.

I~I(A) holds

for all

Lemma

2.1.1,

the n o r m

=

~.i(~)

on

More generally,

the

supp(A ) Z

~ E ba(F, ~) we have

the

and

ba(F, ~ )

is i d e n t i c a l

identity

l~(Ai) l A £ F . As an i m p r o v e m e n t

following

well-known

result:

of

with

64

2.1.2.

Theorem.

The class

ba(F, ~)

is an A L - s p a c e for the n o r m

Proof.

The n o r m

ba(F, ~)

is c o m p l e t e for the n o r m

l.I(~)

is an L-norm,

I.~(~)

and the v e c t o r lattice

l.I(~)

This result will prove to be useful in the sequel since the p r o p e r t i e s of A L - s p a c e s lead to a simple proof of the L e b e s g u e d e c o m p o s i t i o n for m e a s u r e s in

ba(F, ~)

and also serve to p r o v e that the g e n e r a l i z e d

R a d o n - N i k o d y m d e r i v a t i v e for m e a s u r e s in

ba(F, ~)

is the b e s t p o s s i b l e

g e n e r a l i z a t i o n of the c l a s s i c a l R a d o n - N i k o d y m derivative.

If

~

is a m e a s u r e in

~-continuous ~J(A) Thus,

< 6

ba(F, ~)

if for each implies

, then a m e a s u r e

e £ (0,~)

I~(A)

~ 6 ba(F, ~)

there exists

66

(0,~)

< c , and it is @ - s i n g u l a r if

is

such that I~^I~I

= 0 .

s i n g u l a r i t y of a b o u n d e d m e a s u r e w i t h respect to a n o t h e r one is

n o t h i n g else than an a s y m m e t r i c f o r m u l a t i o n of the o r t h o g o n a l i t y of these measures.

For

~ 6 ba(F, JR) , let

all ~ - c o n t i n u o u s m e a s u r e s in 2.1.3.

ba~(F, ~)

ba(F, ~)

Lemma.

{~}l holds for all

Proof.

=

ba~(F, m ) l

~Eba(F,

~)

°

We c l e a r l y have

Conversely,

consider

choose

66

choose

(0,~)

A6 F

and t h e r e f o r e

{~} c ba~(F, ~)

B E {~}I

and

such that

such that

J~l(A) + l ~ i ( ~ A )

I~I(A)

~(A)

< e , hence

, hence

~Eba~(F, < 6

+ l~l(Q~A) l~I^[~l

2.1.4.

Theorem. ~ C ba(F, JR) , the classes

and p r o j e c t i o n bands in ba~(F, JR)

ideals in

ba~(F, ~ ) I

. Fix

I~I (A) < e/2

< min {6,E/2}

= 0 , since

E

~ {~}±

e £ (0,~)

,

, and

. Then we have

was arbitrary,

~ E ba~(F, ~) I .

For each

Proof.

~)

implies

u

The n e x t result is the L e b e s @ u e d e c o m p o s i t i o n

sum of

d e n o t e the class of

and

ba(F, JR) . Moreover,

and

{~}I

ba(F, JR)

are A L - s p a c e s is the d i r e c t

{~}I .

It is easy to check that ba(F, ~)

ba~(F, ~)

for b o u n d e d measures:

. Since

ba~(F, ~)

ba(F, ~)

and

{~}I

is an AL-space,

are closed

these c l o s e d

85

ideals

are p r o j e c t i o n

complete, and

hence

bands.

Being

it is the d i r e c t

ba~(F, ~ ) ±

an AL-space,

ba(F, ~)

sum of the p r o j e c t i o n

. N o w the final a s s e r t i o n

follows

is o r d e r

bands

ba~(F, ~)

from the p r e v i o u s

lemma,

s

: F

A measure

~

E ~ ( A n) n=l holds X A

=

F

of m u t u a l l y

ca(F, ~ ) > ~

that a c o u n t a b l y

additive

if the i d e n t i t y

~( E A n) n=l

for each s e q u e n c e 6 F . Let

n measures

F

is c o u n t a b l y

denote

, and define additive

disjoint

sets

An £ F

satisfying

the class

of all c o u n t a b l y

bca(F, ~)

:= ba(F, ~) A ca(F, ~)

. Note

need not be b o u n d e d

unless

measure

F

> ~

additive

is a a-algebra.

2.1.5.

Theorem.

The class

bca(F, ~)

is an A L - s p a c e

and a p r o j e c t i o n

band

in

ba(F, ~)

We omit the easy proof.

Let

~

denote

the o - a l g e b r a

ca(F, JR)

The map a s s o c i a t i n g extension

=

by

F . Then we have

bca(F, JR)

w i t h each p o s i t i v e

to a p o s i t i v e

positively

generated

homogeneous.

measure

in

measure

ca(F, ~)

It t h e r e f o r e

in

bca(F, ~ )

is c l e a r l y

has a u n i q u e

its u n i q u e

additive

extension

and

to a p o s i t i v e

linear m a p

J

2.1.6.

Proof.

bca(F, ~)

> ca(~, ~)

Theorem.

The map onto

:

J

is an isometric

vector

lattice

isomorphism

of

bca(F, ~)

ca(T, ~)

Consider

~£bca(F,

~+(A)

(J~)+(A)

Conversely,

for

<

B £ ~(A)

IJ~i(BAC)

<

and

e

~)

and

e 6 (0,~)

A £ F . Clearly,

, choose

C £ F

we have

such that

66

[80; T h e o r e m

13.D].

(J~) (B)

Then we have

=

(J~)

(BnC)

+

(J~)

(BnC c)

=

(J~) (AnC)

-

(J~) (AnBcnc)

<

~(AnC)

+

<

~+ (A)

+ ~

+

(J~) (BnC c)

IJ~I(BAC)

,

hence

(JB) + (A)

Therefore,

(J~)+

IJ~l

which

<

means

~+ (A)

is the e x t e n s i o n

=

2(JB) + - J ~

that

J

Corollary.

For

~ E bca(F, ~)

each

vector

Proof.

First

additive.

Consider

such

that

note

I~I(C)

C E F

< 6

such

8/2

~)

of

of

=

lattice

J

to

I~I(C)

e £ (0,~) < e/2

+

ba~(F, ~) onto

<

min

since

. For

{8/2,e/2}

2.1.6,

=

IJ~I(CnA)

+

<

IJ~I(A)

IJ~I(AAC)

<

8

•

+

I J ~ I ( C n A c)

Jl~l

,

AE;

.

is an

b a J @ ( ~ , ~)

~

is c o u n t a b l y

, and choose

,

IJ~I(AAC)

=

isomorphism.

b a @ ( F , ~)

c bca(F, ~)

, fix

yields

J(2~+-~)

that

by Theorem

l~l(C)

ba~(F, ~)

implies

<

IJ~I(AAC)

T h e n we have,

that

, and this

vector

restriction

isomorphism

BEba@(F,

IJ~I(A)

choose

, the

lattice

~+

2J~ + - J~

is an i s o m e t r i c

2.1.7.

isometric

--

of

66

(0,~)

satisfying

67 hence

I~I(C)

z12

,

and t h e r e f o r e

|J~l (A)

=

~J~I(AnC)

<

l~l(C)

<

c

+ IJ~I(ANC c)

+ IJ~I(A~C)

,

as was to be shown.

For the remainder of this section,

:

be a fixed

F

>

let

[0,1]

(countably additive)

p r o b a b i l i t y measure.

By the R a d o n - N i k o d y m

theorem, the map Rl :

baJl(;, ~)

> L1(;,Jl, m)

,

w h i c h a s s o c i a t e s w i t h each J l - c o n t i n u o u s m e a s u r e on d e r i v a t i v e with respect to isomorphism.

~

F r o m this it follows, by C o r o l l a r y 2.1.7,

RI0 J :

bal(F, JR)

its R a d o n - N i k o d y m

Jl , is an isometric v e c t o r lattice that the map

> L!(;,JI, ~)

also is an isometric vector lattice isomorphism.

The map

be called the R a d o n - N i k o d y m o p e r a t o r w i t h respect to Cl :

ba(F, ~)

> bal(F, ~)

Sl :

ba(F, ~)

> {X} ±

Rl o J

will

I . Let

and

denote the band p r o j e c t i o n s g u a r a n t e e d by T h e o r e m 2.1.4, and define Dl

The map

:=

Rio J 0 C l

88

D1 :

ba(F, JR)

> L 1(;,Jl, JR)

will be called the 9 e n e r a l i z e d to

~ . For

~ 6 ba(F, ~)

be called the 9 e n e r a l i z e d to

I . The properties

exhibited

R a d o n - N i k o d y m o p e r a t o r with respect

, the random variable

DI~£LI(~,JI,

R a d o n - N i k o d y m derivative

of the g e n e r a l i z e d

in the following

of

~

Radon-Nikodym

~)

will

with respect operator are

theorem which is the main result of this

section: 2.1.8.

Theorem.

The generalized homomorphism

Radon-Nikodym

ba(F, ~)

operator

Dl

> LI(F,JI, ~)

operator

R 1 o J . Moreover,

Proof.

It is clear from the properties

D1

D1

U : which extends

projection

ba(F, ~)

C1 ,

extending

J

R1 o J

and

R~

that

and that

is

D1

> LI([,JI, ~)

R 1 o J . Then the map (R~ o j)-1 o U

band since

IR1 o j)-1 o U

of

Consider now an arbitrary vector lattice h o m o m o r p h i s m

h o m o m o r p h i s m which is continuous the kernel of

the R a d o n - N i k o d y m

is a contraction.

is a vector lattice h o m o m o r p h i s m

a contraction.

is the unique vector lattice

which extends

since

ba(F, ~)

commutes,

( ( R l o J ) -1 o U ) ~

is a vector lattice

ba(F, ~)

is complete.

is a closed ideal which actually is an AL-space.

is a band projection.

band p r o j e c t i o n s

(Rl o j)-1 0 U

Hence is a

It follows that

Using the fact that every pair of

we obtain,

for all

~ E ba(F, ~)

=

( ( R l o J ) -1 o U o C l ) ~

=

Cl~ + (S ~ o (R~ 0 J)-I o U ) ~

,

+ ( ( R l o J ) -I o U o S l ) ~ ,

hence ((Rlo j)-1 o U)~ - Cl~

Since the left hand side is in in

bal(F, ~ ) ±

and Lemma

(S ~ o (R~ o j)-I o U)~

bal(F, ~)

, both expressions

U~ = ( R l o

JoCl)~

=

of

.

while the right hand side is

must be equal to

2.1.3. Now the application ( (Rk o j)-I o U)~

yields

=

Rl o J

0 , by T h e o r e m

2.1.4

to the identity

Cl~

for all

~£ba(F,

~)

, as was to be shown,

a

2.2.

S e t

In t h i s basic

Let

f u n c t i o n

section,

we

introduce

p r o c e s s e s .

set f u n c t i o n

processes

and establish

their

properties.

F

be a stochastic

basis

on a set

~

.

A sequence

:= will

be c a l l e d

The

concepts

stochastic processes

a set f u n c t i 0 n

of s t o p p i n g

processes. and

Consider A6

{ ~n 6 ba(Fn, ~)

study

process

}

on

and conditioning

We

shall

some

a set f u n c t i o n

I n 6~

now adapt

of t h e i r

process

F

.

are

essential

these

concepts

in the

theory

of

to set f u n c t i o n

properties.

_~

and a bounded

stopping

side

extends

time

T

. For

FT , define

~T(A)

Note

that

finite

the

number

t h a t we h a v e modulus

If

~

Z p=1

~p (AA{~=p})

sum on the r i g h t of t e r m s

since

~T E ba(FT, ~)

(or v a r i a t i o n )

2.2.1. then

:=

of

hand

actually

T

is b o u n d e d .

• The

following

~T

will

be

From

this,

elementary

frequently

only

on the

in the

sequel:

stopping

time,

Lemma. is a set f u n c t i o n

the

process

and

•

is a b o u n d e d

identity

I~TI (A)

=

Z

I~pl

(An{~=p})

p=l holds

Proof.

for all

For • For

C E F P

A E

FT

p E~

and

B E F ({T=p}) T

I ~ I (B)

Cc

{T=p}

, this

, we h a v e

C 6 F

if and o n l y

yields

=

supF~(B)

(~r(C) - ~ T ( B ~ C ) )

=

sUpFp(B)

(~p(C) - ~p(B~C))

=

a

it is a l s o c l e a r lemma

used

over

i~pl (B)

if

70

and,

for

A £ F

, we d e d u c e

T

lu..c I (A)

=

)"

I]J.c I (An{'c=p})

=

)-

p=l as w a s

For

to be

~ E T

,

T E T(~) U {~}

R ~

of

RT M which will

:

we w i l l

be

and

A 6 F

, define

B(A)

in

to

F

with

~ 6 a(FT, ~)

a(F

, ~)

, and

will

be c a l l e d

linear

the

map

, ~)

each measure

interested

which

the p o s i t i v e

• a(F

the r e s t r i c t i o n

in

map

a(FT, ~)

from

in the

its r e s t r i c t i o n

a(FT, ~)

restriction

to

of

a(F

RT

, ~)

to

M

to

F

,

. In m o s t

b a ( F T , ~)

Lemma.

M £ T

and

RTX :

is a p o s i t i v e

Proof.

However,

, the

restriction

b a ( F T , JR)

> b a ( F x , ~)

~£ba(F

, ~)

T IR ~I (A)

=

suPF

(A)

(%I(B) - ~ ( A ~ B ) )

suPF

(A)

(~(B) - ~ ( A ~ B ) )

the

this

yields

restriction as

can

map

contraction.

Consider

homomorphism,

2.2.3.

T E T(~) U {~}

linear

In p a r t i c u l a r ,

be

. T h e n we have,

[RxBI (Q) <

map

RT

seen

need

from

the

for all

=

[~I (Q)

F

,

I~I(A)

, as w a s

n o t be a v e c t o r following

A6

to be

shown.

lattice

example:

Example.

Define which

,

a(FT, ZR)

associates

2.2.2. For

B

be c a l l e d

cases,

:=

is a m e a s u r e

restriction

,

shown.

T (R ~) (A)

Then

lU.pl (An{c=p})

p=l

~

:= ~

and,

is g e n e r a t e d

consists

of all

complement.

for all

b y the

subsets

Now define

of

n 6~

subsets ~

measures

, define of

which

F

n {I,2,...,n}

are

finite

~, ~ E b a ( F

, ~)

to b e the a l g e b r a . Then

of h a v e by

on

the algebra a finite

letting

F

71

:=

~(A)

]

0

,

if

A

is f i n i t e

[

I

,

if

~A

is f i n i t e

and

~(A)

TSen

~

and

:=

~

Z 2 -k k 6 A

are o r t h o g o n a l ,

are not orthogonal,

In the

sequel,

however, algebra

For

be and

we

shall

important

:=

and

is b o u n d e d .

the u p p e r

index

of

carefully

between

R T . It will, x a m e a s u r e on an

are

three ~

different

is ~ - b o u n d e d

notions

of

if the v a l u e

IUTI(n) if the n e t

}

properties

are related

as follows:

Theorem.

a set f u n c t i o n

(a)

~

is an ~ - b o u n d e d

(b)

~

is T - b o u n d e d .

Proof.

Suppose

m

:= m a x ~

process

first

and choose + B~(~)

Define

R~

if the v a l u e

For

6 T

and

l~nl (~)

suPT

I T6T

These

omit

process

it is a s e m i a m a r t

{ B~(Q)

R~B

.

there

it is T - b o u n d e d

is finite;

restrictions

to a s u b a l g e b r a .

su b

:=

their

to d i s t i n g u i s h

processes,

II ~ IIT

2.2.4.

usually

A set f u n c t i o n

il _~ I ~ is finite;

n 6~

its r e s t r i c t i o n

set f u n c t i o n

boundedness.

for all

but

A £ F

<

that such

M

BK(A)

~(~)

~

, the

following

are e q u i v a l e n t :

semiamart.

~

is an ~ - b o u n d e d

semiamart.

Consider

that

+ I

, and define

a stopping

time

u £ T

by

letting

72

=

I

M (co)

,

if

~ £A

[

m

,

if

co 6 ~ A

~(~)

Then we have +

-

1

<

~(A)

+ ~v(n~A)

By(~)

+

sup T

- ~m(~A)

IBml(n)

i~T(~) I + su b

[~nl(~)

+

hence

sup T ~T(Q)

finite.

The

we shall

is finite,

converse

is

see that the m o s t

is that of T - b o u n d e d n e s s . funct i o n

processes,

following

obvious

2.2.5.

Theorem.

and it follows

important In fact,

the m a p

~ ~ >

II. IIT .

We shall also

see that c e r t a i n lattice

Theorem

II. I ~

are ~ - b o u n d e d

2.2.4.

not

is a norm,

processes

other c l a s s e s II. IIT

between

the ~ - n o r m

if and only

in the r e s p e c t i v e

set

and we have

which

is a B a n a c h

of set f u n c t i o n

the

it c a n n o t

we t h e r e f o r e

and T - b o u n d e d n e s s

in g e n e r a l

be

norms.

is ~ - b o u n d e d

need not

For the sake of simplicity, if and only

a

if it is T - b o u n d e d

let

of this chapter,

real

by

so far as we are

For the r e m a i n d e r

be a fixed p r o b a b i l i t y

processes

and the T-norm,

if it is ~ - b o u n d e d .

>

lattice

• The T - n o r m a l s o o c c u r s

will b r i e f l y be said to be b o u n d e d

F

concepts

if they are T-bounded,

In the case of semiamarts,

process

X :

is

•

between ~-boundedness

interested

set f u n c t i o n

II ~ IIT

a n d in b o t h s i t u a t i o n s

In spite of the d i f f e r e n c e

distinguish

of t h e s e b o u n d e d n e s s

for the T - n o r m

inequality,

r e p l a c e d by the ~ - n o r m

semiamarts

IBrl(~)

on the class of all T - b o u n d e d

set f u n c t i o n

for the n o r m

form a B a n a c h

suPT

result:

The class of all T - b o u n d e d

in a m a x i m a l

that

obvious.

[0,1]

measure.

If

is a set f u n c t i o n

process,

then

73

the generalized

Radon-Nikodym

will be denoted by

DnlJ- n

for all

n EIN .

,

derivative

of

~n

with respect to

Rnl

2.3.

M a r t i n 9 a 1 e S .

A set f u n c t i o n is c o n s t a n t . be

seen

process

f r o m the

is a m a r t i n g a l e

following

characterizations

2.3•1.

~

The equivalence

of this theorem

if the n e t

definition

which

also

{ ~T(~)

with

the u s u a l

contains

Theorem• process

~

, the

following

are e q u i v a l e n t :

(a)

~

(b)

~T = R T ~ c

holds

for all

• E T

and

~ £ T(T)

(c)

~n

= RnBm

holds

for all

n 6~

and

m 6~(n)

(d)

~n

= Rn~n+1

(e)

(f)

(g)

Proof• T

further

of m a r t i n g a l e s :

F o r a set f u n c t i o n

A £ F

some

I T 6 T one can

is a m a r t i n g a l e .

There

exists

holds

for all

There

exists

holds

for all

There

exists

holds

for all

Suppose • Define

first

holds

a measure n 6~

r E T

I

.

5 £ a(F

, ~)

such

that

~n = R n ~

~ E a(F

, ~)

such

that

~T

~6 a(F

, ~)

such

that

~T(~)

= R ~

.

a measure T £ T

that

n 6~

.

a measure

a stopping

~(~)

for all

= ~(Q)

.

(a) holds.

time

v £ T

Consider

by

• C T

,

C T(T)

and

letting

T(~)

,

if

~ 6 A

~(~)

,

if

~ £ ~A

:=

Then we have

~T(A)

+ ~(~A)

=

~v(~)

:

~(~)

,

F

, there

exists

, we t h e n h a v e

A £ Fm

hence

~T (A)

Therefore, Suppose

:

~(~ (A)

(a) i m p l i e s

now that

that

A£

~m(A)

= ~n(A)

Fn

(c) holds.

holds.

~(A)

(b). For

F o r all

, hence

:=

lim ~m(A)

each

mE~(n)

A6

n£3~ and

such

}

76

exists for all

A £ F

~n(A)

=

and defines a m e a s u r e

_~

is a martingale,

~(A) A£ F

, JR)

such that

~(A)

holds for all n 61~ and A 6 F . Therefore, n The r e m a i n i n g i m p l i c a t i o n s are obvious.

If

£ a(F

:=

then the m e a s u r e

lim ~n(A)

(c) implies

~ 6 a(F

, JR)

(e).

given by

,

, will be c a l l e d the limit m e a s u r e of

~ . We shall see that

certain p r o p e r t i e s of m a r t i n g a l e s can be e x p r e s s e d by p r o p e r t i e s of their limit measures.

2.3.2. If

~

Theorem. is a m a r t i n g a l e with limit m e a s u r e

II__~ II~ In particular,

=

II__~ IIT

=

~ , then

I~I(~)

a m a r t i n g a l e is b o u n d e d if and only if its limit measure

is bounded.

Proof.

F r o m T h e o r e m 2.3.1 we obtain

II~II~ b e c a u s e of

~ E T

<

ll£11 T

and since

<

l~,l(n)

RT

Lemma 2.2.2. For each p a r t i t i o n n 61~

such that

i=1

J~(A i) ~

=

k Z i=I

for all

{ A I , A 2 , . . . , A k} £ ~ ( ~ )

{ A I , A 2 , . . . , A k} £ Pn(~)

k Z

is a contraction,

I~n(A i) I

~ 6 T , by

, there exists

. This yields

~

i~nl (~)

~

II ~ I ~

,

hence

by taking the s u p r e m u m over

P (~)

.

The close r e l a t i o n s h i p b e t w e e n b o u n d e d m a r t i n g a l e s and their limit m e a s u r e s becomes p a r t i c u l a r l y clear from the f o l l o w i n g result:

78

2.3.3.

Theorem.

The class of all b o u n d e d m a r t i n g a l e s norm

H.

l~

limitmeasure

is an i s o m e t r i c

bounded martingales

Proof.

measure

and T h e o r e m

Thus

F

structure

lattice

F

of

onto

martingale

example:

2.3.4.

Example.

On the s t a n d a r d ~

ba(F of

, ~)

ba(F

n 6~

set f u n c t i o n

stochastic

for the

of the B a n a c h

its

space of all

is u n i q u e l y follows

determined

from T h e o r e m

by a 2.3.2

on

F

it u s u a l l y

inherits

the B a n a c h

does not inherit

the

is due to the fact that the homomorphisms;

the s i t u a t i o n

becomes

see E x a m p l e clear

from the

[0,I) • d e f i n e a set f u n c t i o n

on

k £ K(n) I~I

The m i s s i n g

n E~

lattice

bounded martingales

=

if

2 -n

,

otherwise

~

is a b o u n d e d

. Then

2(I-2 -n)

k = 1

<

martingale,

but the

since

2(1-2 - (n*1))

=

l~n+ I I (~)

.

property which

is a s h o r t c o m i n g

certainly

in m a r t i n g a l e s

theorem•

such an e x t e n s i o n which

,

is not a m a r t i n g a l e

inter e s t

prope r t i e s ,

2 -n - I

:=

and

for all

Section

F

. This

basis

process

l~nl (a)

valid.

space

by letting

~n (Bn,k)

processes

on

, but

, ~)

[

for all

is a B a n a c h

, ~)

. N o w the a s s e r t i o n

For b o u n d e d m a r t i n g a l e s ,

process

ba(F

maps m a y fail to be lattice

following

holds

isomorphism

of all b o u n d e d m a r t i n g a l e s

structure

restriction 2.2.3.

on

F

w i t h each b o u n d e d m a r t i n g a l e

2.1.2.

the class

space

on

Every bounded

bounded

on

, and the map a s s o c i a t i n g

is m a i n l y

contains

should

motivates

Since

the

convergence

lead to a class of set f u n c t i o n

the b o u n d e d m a r t i n g a l e s •

to the e x t e n s i o n

has b e t t e r

convergence problem

theorem

in Section

2.5.

L e t us n o w turn to the m a r t i n g a l e

of all

its extension.

due to the p o i n t w i s e

and for w h i c h the p o i n t w i s e

We shall return

of the class

convergence

theorem.

stability remains

2.4 and in

77

A martingale exists

~

is u n i f o r m l y l - c o n t i n u o u s

6 C (0,~)

2.3.5.

such that

l(A)

< 6

if for each

implies

su b

e E (0,~)

l~n[(A)

there

<

Theorem.

For a b o u n d e d m a r t i n g a l e

~

, the following

and its limit m e a s u r e

are equivalent: (a)

~

is u n i f o r m l y l-continuous.

(b)

~

is l-continuous.

Proof.

As in the proof of T h e o r e m 2.3.2,

it can be d e d u c e d from

T h e o r e m 2.3.1 that

su b holds for all

[~nI(A) A £ F

=

[~[(A)

. From this the a s s e r t i o n follows.

This result leads us to the L e b e s ~ u e d e c p m P g s i t i o n for b o u n d e d martingales:

2.3.6.

Theorem.

Every b o u n d e d m a r t i n g a l e

is the sum of a b o u n d e d u n i f o r m l y l - c o n t i n u o u s

m a r t i n g a l e and a b o u n d e d m a r t i n g a l e w i t h l - s i n g u l a r limit measure. The d e c o m p o s i t i o n is unique.

Proof.

This is an immediate c o n s e q u e n c e of the L e b e s g u e d e c o m p o s i t i o n

for b o u n d e d m e a s u r e s b o u n d e d martingale,

(Theorem 2.1.4), a p p l i e d to the limit measure of a and c o m b i n e d with T h e o r e m 2.3.5.

In the sequel, the limit m e a s u r e of a m a r t i n g a l e

~

[] will sometimes be

denoted by

lim~ n a l t h o u g h this is a slight abuse of notation. The L e b e s g u e d e c o m p o s i t i o n for b o u n d e d m a r t i n g a l e s suggests s p l i t t i n g the proof of the m a r t i n g a l e c o n v e r g e n c e t h e o r e m into two parts:

2.3.7. If

~

Theorem. is a b o u n d e d u n i f o r m l y l - c o n t i n u o u s martingale,

lim Dn~ n

=

D

lim Bn

a.e.

then

78

Proof.

By T h e o r e m

X If

EnX

:=

2.3.5, w e h a v e

~ -- l i m ~n 6 b a l ( F ,

~)

. Define

D 5

denotes

the c o n d i t i o n a l

expectation

of

X

with respect

to

Fn

then we h a v e

Dn~ n for all

nqlq

=

EnX

. By L ~ v y ' s

lim E X n from which 2.3.8. If

_~

,

=

X

theorem

a.e.

the a s s e r t i o n

[42; T h e o r e m

,

follows,

m

Theorem. is a b o u n d e d m a r t i n g a l e

lim DnB n Proof.

--

0

Therefore,

F i r s t n o t e t h a t the A - s i n g u l a r i t y

the g e n e r a l i z e d

zero. F o r all

Xn and choose

with A-singular

of

Bn = R n ~

Radon-Nikodym

of

Dn~ n

Fn-measurable

simple

°f

IXn-Znl

d l J n R n A)

, choose

A £ F

E, 6 E (0,~)

~(A)

<

E6

functions

<

A(~A)

<

6

such that

and

k E~

°I

Z n=k

; see E x a m p l e

n C]N , d e f i n e

:=

,

such that

IXn-Znl Q

then

of the l i m i t m e a s u r e

derivatives

n~1

and choose

limit measure,

a.e.

does not imply RnA-Singularity

Fix

1.4], w e h a v e

A £ Fk

dlJnRnX)

and

<

c6

Zn

such that

2.2.3. _~

need not be

i

79

Now define Bk

:=

and, for all

n 6~(k+I)

Bn This yields,

A n { iZki > E}

::

E

Fk

,

A N {IZni > e} N ( D_k{IZpl < e } p-

for all

m£3(k)

£

Fn

_<

1St (A)

<

m

I

,

m X n=k

IXnl d(JnRnl) B

<

~ n=k

n

i~ni (B n)

m

I~I (B n)

e6

,

n=k hence

im

m

e(J l) k Z B n n=k

=

e

Z n=k

(JnRn l) (B n)

--< n--Xk B IZnl d(JnRn ~) n

<

n[k

B IZn-X nl d(JnRn ~) + nX=k n

<

2e6

,

B IXnl d(JnRn~) n

m

and therefore,

letting

(J l)\n=X k Bn>

m

tend to infinity,

<

26

This yields (J ~ ) ( { s u ~ ( k ) i Z n l which implies lim Z Furthermore,

n

from

=

0

a.e.

> e})

<

(J l)< ~ Bn> + l ( ~ A ) n k

<

36

,

co

e(J ~) ({sup~(k) IXn-Znl > e})

<

e

X n=k

<

Z

--

n=k

<

e8

I

(JnRn A) ({ IXn-Znl > e})

IX -Z ~

n

n

I d(JnRnl)

we obtain

lim Therefore,

(Xn-Z n)

=

0

a.e.

we have lim X

n

=

0

a.e.

as was to be shown. Combining

these results,

we obtain the general martingale

convergence

theorem: 2.3.9. If

~

Corollar~. is a bounded martingale,

lim Dn~ n Proof.

=

D~ lim ~n

then

a.e.

First use the Lebesgue d e c o m p o s i t i o n

(Theorem 2.3.6)

apply Theorem 2.3.7 and Theorem 2.3.8. Now the assertion the linearity of the g e n e r a l i z e d

Radon-Nikodym

operators,

and then

follows from u

2.4.

Subma

r t inca

and

~ua

1 e s

s imar

t inga

le

s

The e x t e n s i o n p r o b l e m for the class of b o u n d e d m a r t i n g a l e s n a t u r a l l y leads to set function processes which are the s u p r e m u m of two b o u n d e d martingales. v ~

If

~

and

~

are martingales,

then the set function

need not be a m a r t i n g a l e since the net

n e e d not be constant; 2.3.4 and

~

for example,

:= -~ . However,

{ ( ~ T v ~ ) (Q)

consider

the net

~

J T 6 T }

as d e f i n e d in Example

{ (~TV~T) (~)

J T £ T }

is

increasing since (~ v~T) (Q)

=

supF

(B~(A) + ~ ( Q ~ A ) ) T

sup F

(~o(A) + ~o(n~A))

=

(~ovmo)(n)

a holds for all

I £ T

and

~ £ T(T)

. This leads to the following

definition: A set f u n c t i o n process if the net

{ ~T(~)

~

is a s u b m a r t i n ~ a l e

J T 6T

}

is i n c r e a s i n g

(resp. supermartingale)

(resp. decreasing).

S u b m a r t i n g a l e s may be c h a r a c t e r i z e d as follows:

2.4.1.

Theorem.

For a set function process

~ , the f o l l o w i n g are equivalent:

(a)

~

(b)

~T ~ R T ~ a

holds for all

T £ T

and

o 6 T(T)

(c)

~n ~ Rn~m

holds for all

n 6~

and

m£~(n)

(d)

Bn ~ Rn~n+1

Proof. implies

is a submartingale.

holds for all

n 6~

.

It can be shown as in the proof of T h e o r e m 2.3.1 that (b). Obviously,

(b) implies

(c), and

(c) implies

Suppose now that

(d) holds. C o n s i d e r stopping times

and define

:= max n T(~)

m(r)

~r(n)

=

m(r) Z p=1

and

m(a)

~p({r=p})

m(T) Z

p=1

~p ({ ~=p}D {o>_p})

:= m a x ~ ~(~)

T 6 T

(a)

(d). and

o £ T(~)

. Then we have

,

82

m(x) ( -<

p:Ir ~p({r=p}N{a=p})+ Bp+1({T=p}N{o>_p+1})h/

<

re(T) re(a) X Z ~ ({r=p}N{c=q}) p=1 q=p

m(o)

q

Z q=l

Z p=l

~q ({r=p}N{~=q})

= ~a(n) Therefore,

(d) implies

(a}.

One of the m o s t e f f i c i e n t c o n c e p t s in the theory of g e n e r a l i z e d martingales

is the Riesz d e c o m p o s i t i o n of a process into a m a r t i n g a l e

and a p o t e n t i a l p a r t w h i c h c o n v e r g e s to zero in some sense. B e f o r e p r o v i n g the Riesz d e c o m p o s i t i o n for ~ - b o u n d e d

s u b m a r t i n g a l e s and

s u p e r m a r t i n g a l e s , we have to define an a p p r o p r i a t e type of potential:

A set f u n c t i o n process { ~(~)

I T £ T }

~

is a Doob p o t e n t i a l if the net

d e c r e a s e s to

0 . Clearly, e v e r y Doob p o t e n t i a l

is a

s u p e r m a r t i n g a l e w h i c h is p o s i t i v e and T-bounded.

We can now prove the Riesz d e c o m p o s i t i o n f o r ~ - b o u n d e d

submartingales

and supermartingales:

2.4.2.

Theorem.

Every ~ - b o u n d e d

s u b m a r t i n g a l e is the d i f f e r e n c e of a b o u n d e d m a r t i n g a l e

and a Doob potential. Every ~ - b o u n d e d

s u p e r m a r t i n g a l e is the sum of a b o u n d e d m a r t i n g a l e and

a Doob potential. In either case, the d e c o m p o s i t i o n is unique. Proof.

C o n s i d e r an ~ - b o u n d e d

{ ~n (A) A£ F

I n 6~

}

submartingale

is b o u n d e d and increasing,

~

. Then the sequence

hence convergent,

for all

. Therefore,

~(A) exists for all

:= A£ F

lim ~n(A) and d e f i n e s a m e a s u r e

the set f u n c t i o n p r o c e s s

~£ba(F

, ~)

. Clearly,

:=

{ Rn~

I n£~

is a b o u n d e d martingale,

}

and it is e a s i l y seen that the set f u n c t i o n

process

~

:= ~ - ~

is a Doob potential.

Hence

~

has the Riesz d e c o m p o s i t i o n

~-~

=

If

is an a r b i t r a r y Riesz d e c o m p o s i t i o n of

~ , where

m a r t i n g a l e and

then we have

~

~-_~

is a Doob potential, =

p o t e n t i a l p r o p e r t y of

for all

n 6~

~

and

- ~n(A)

and

is a b o u n d e d

~-~_

Using the m a r t i n g a l e p r o p e r t y of

~n(A)

~

A 6 F

~

and

~

as well as the Doob

~ , this y i e l d s

=

lim

(~m(A) - ~ m ( A ) )

=

lim

~m(A)

n

-

lim

~m(A)

=

0

,

. T h e r e f o r e the Riesz d e c o m p o s i t i o n is

unique.

Since every Doob p o t e n t i a l for m - b o u n d e d

2.4.3.

is T-bounded,

the Riesz d e c o m p o s i t i o n

s u b m a r t i n g a l e s yields the f o l l o w i n g result:

Corollary.

Every m - b o u n d e d

submartingale

is T-bounded.

Further results on s u b m a r t i n g a l e s and s u p e r m a r t i n g a l e s will be given in C h a p t e r 4, Section 3.

Let us now return to the e x t e n s i o n p r o b l e m for the class of b o u n d e d martingales.

F r o m the c o n s i d e r a t i o n s at the b e g i n n i n g of this section,

it is clear that such an e x t e n s i o n should at least c o m p r i s e those

84 bounded the

submartingales

infimum

function can

processes

be s e e n

2.4.4. On the

and

supermartingales

of two m a r t i n g a l e s .

from

is s t i l l

the

However,

too

following

small

which

are

the r e s u l t i n g

since

the

supremum

class

of

or

set

it n e e d n o t be l i n e a r ,

as

example:

Example. standard

processes

~

stochastic

and

~

basis

on

[0,1)

, define

set f u n c t i o n

by l e t t i n g

[

2 -n - I

,

if

k = I

2 -n

,

otherwise

2 -n - I

,

if

2 -n

,

otherwise

~

and

:=

~n (Bn,k)

and

[ ~ n (Bn,k)

for all hence

n 6~ ILl

process

and

and

I~I

A set f u n c t i o n

. Then

are b o u n d e d

is n e i t h e r

the c l a s s

supermartingales

Z

k £ K(n)

I ~ I - I~I

In p a r t i c u l a r ,

need

are bounded

submartingales,

of a l l b o u n d e d

~

~

a submartingale

not be linear

process

l~n-Rn~n+11(Q)

k = 2n

:=

and

but

nor

set

function

a supermartingale.

submartingales therefore

is a q u a s i m a r t i n @ a l e

the

martingales,

has

if the

and to b e e n l a r g e d .

series

is c o n v e r g e n t .

Quasimartingales

are

closely

related

to s u b m a r t i n g a l e s

and

supermartingales:

2.4.5.

Lemma.

Every ~-bounded

quasimartingale

is the d i f f e r e n c e

of t w o p o s i t i v e

supermartingales.

Proof.

Consider

all

,

m 6~

+ ~m Thus,

for all

an ~ - b o u n d e d

quasimartingale

)+ --<

and

A £ F

. T h e n we have,

+

(~m-Rm~m+1

n 6~

~

+

n

(Rm~m+1) , the b o u n d e d

sequence

for

85 m-1 X k=n is increasing,

hence convergent,

q0n(A) Then

~

process

:=

1;

and we may define

(~-~k+1)+(A)

supermartingale.

+ +~m(A)

Similarly,

]

the set function

given by

@n(A) n C~

m-1 Z k=n

lim

is a positive ~

+ ~m+ A( ) I m 6 ~ ( n + 1 )

(~k-~k+1)+(A)

and

A £ F ~

--

::

m-1 Z k=n

lim (

(~_Rk~+I)-(A)

, is a positive

n

~ - e

+~m(A ) h J

supermartingale,

and we have

,

D

as was to be shown. 2.4.6.

Corollary.

Every ~ - b o u n d e d Proof.

quasimartingale

Apply Corollary

More generally,

is T-bounded.

2.4.3.

every quasimartingale

is a semiamart,

as can be seen

from Theorem 2.5.1 and Lemma 2.5.2 below. Lemma 2,4.5 also leads to the Riesz d e c o m p o s i t i o n

for bounded

quasimartingales: 2.4.7.

Theorem.

Every b o u n d e d q u a s i m a r t i n g a l e the difference Proof.

and

of two Doob potentials.

First apply Lemma

supermartingale

is the sum of a b o u n d e d m a r t i n g a l e

2.4.5 and note that each positive

is ~ - b o u n d e d .

Then the assertion

follows

from Theorem

2.4.2 and Theorem 2.3.3. In the Riesz d e c o m p o s i t i o n and the difference

for a bounded quasimartingale,

of Doob p o t e n t i a l s

are unique,

the m a r t i n g a l e

but the Doob potentials

themselves need not be uniquely determined. Another consequence describes

of Lemma 2.4.5 is the following

result which

the structure of the class of all bounded quasimartingales:

86

2.4.8.

Theorem.

The c l a s s of all b o u n d e d containing

Proof.

all b o u n d e d

T h e c l a s s of all b o u n d e d

and contains vector

the b o u n d e d

space containing

us n o w p r o v e lattice. have,

quasimartingales

To this end, n 6~

+ ~n

<

(~

- R

quasimartingales

submartingales. all b o u n d e d

t h a t the c l a s s

for all

is the s m a l l e s t v e c t o r

lattice

submartingales.

Moreover,

submartingales,

of all b o u n d e d

consider

a bounded

is c l e a r l y

linear

it is the s m a l l e s t by Lemma

quasimartingales

quasimartingale

~

2.4.5.

Let

is a v e c t o r . T h e n we

, )+

+

(~n-RnBn+1

+

+ (Rn~n+1)

<

i~n-Rn~n+ I I + R n ~ n + I

hence

+ n~n+l )+

~

I~ n - Rn~n+ll

and therefore

I

+ ~n+ - Rn~n+l i

=

+ + 2 (Bn+ - Rn~n+l ) + - (~n+ - Rn~n+l )

<

2i~n-Rn~n+ll

+

This yields,

for all

m X n=l

m£~

+

+ ( R n ~ n + l - ~ n)

,

+ + l~n-Rn~n+11(~ )

~

2

m Z n=1

l~n-Rn~n+li(~)

+ + ~m+l(~)

2

X n=1

l~n-Rn~n+ I i(n)

+ 211 ~ I ~

- ~(n)

+ Letting

m

t e n d to i n f i n i t y

is c l e a r l y b o u n d e d . is a v e c t o r

In c o n t r a s t the H - n o r m

Therefore,

that

the c l a s s

is a q u a s i m a r t i n g a l e

of all b o u n d e d

which

quasimartingales s

to w h a t is k n o w n

for b o u n d e d m a r t i n g a l e s ,

a n d the T - n o r m are i d e n t i c a l

are u s u a l l y

~

lattice,

neither

quasimartingales.

2.4.9.

shows

identical

by T h e o r e m

nor even equivalent

for w h i c h

2.3.2,

these norms

for b o u n d e d

T h i s c a n be seen f r o m the f o l l o w i n g

example:

Example.

On the s t a n d a r d

stochastic

processes

,

~(m)

m£~

basis

on

, by l e t t i n g

[0,1)

, define

set f u n c t i o n

87

(m)

(Bn,k)

~n

for all ~(m)

n £~

jlT = m

Moreover,

2.4.10.

,

if

I

0

,

otherwise

k 6 K(n)

. Then

n ~ m

each

lattice

for the ~ - n o r m

of all b o u n d e d

as w e l l

for all

. On an a r b i t r a r y

processes

_B(m)

,

n £~

:=

and

is a b o u n d e d

potentials

and

In the B a n a c h

[~

processes

= 1

and

quasimartingales

fails

as c a n be

to

seen

stochastic

m C~

F

basis

on

~

, define

set

, by letting

t

(-1) n n

l

0

- m

-I

,

if

~ 6 A

,

otherwise

and

n < m

A £ F . T h e n e a c h of the set f u n c t i o n p r o c e s s e s n quasimartingale w h i c h is the d i f f e r e n c e of t w o D o o b

for w h i c h

the ~ - n o r m

lattice

of all

{ _~(m)

[

}

to the

set

and

T-bounded

the T - n o r m

are

set f u n c t i o n

identical.

processes

on

F

,

sequence

converges

m£•

function

i

for all

n 6~

Z n=1

and

lack

A E F

2n+1 nln+l)

set f u n c t i o n

In p a r t i c u l a r ,

process

~

which

is d e f i n e d

(-1)n n-1

'

if

0

,

otherwise

by

letting

~6A

:=

Bn (A)

The

[i ~(m)

as f o r the T - n o r m ,

-I

the

set f u n c t i o n

satisfying

example:

,,(m) (A) ~n

the

of the

k = 2

Example. ~ 6 ~

function

~(m)

and

.

the f o l l o w i n g

Choose

I

quasimartingale

the v e c t o r

be c o m p l e t e from

and

is a b o u n d e d

II ~(m)

:=

[

n

=

process ~

cannot

of c o m p l e t e n e s s

. Due

Z

to the

I~ n

identity

Rn~n+ll(~)

n=l ~

fails

to be a q u a s i m a r t i n g a l e .

be the d i f f e r e n c e

of t h e c l a s s

of two D o o b

of all b o u n d e d

potentials.

quasimartingales

88

for b o t h t h e ~ - n o r m extending lattice

and the T - n o r m may be r e g a r d e d

this class

theoretical

this e x t e n s i o n convincing.

2.4.11.

of set f u n c t i o n point of view,

which

concerns

processes

there

is also a n o t h e r

Doob p o t e n t i a l s

Let us first prove

as a m o t i v a t i o n

to a larger one.

the f o l l o w i n g

for

F r o m the

argument

for

and may appear to be more result:

Theorem.

The class of all set f u n c t i o n Doob p o t e n t i a l s

processes

is the s m a l l e s t

vector

w h i c h are the d i f f e r e n c e lattice

containing

of two

all Doob

potentials.

Proof.

The class

difference

set f u n c t i o n

of two Doob p o t e n t i a l s

Doob potentials. Doob p o t e n t i a l

If

it follows

and

=

(~+

~)

~

-

that the m o d u l u s

a difference

This v e c t o r

~

is c l e a r l y

lattice

in w h i c h

of a d i f f e r e n c e

complete

desired

it can be shown

for b o u n d e d

~

processes;

again

is

see Example

is not a d i f f e r e n c e

This

of

and a l t h o u g h

section.

processes

will

By the Riesz convergence

of the g e n e r a l i z e d

process

process

that a p o i n t w i s e processes

a.e.

Furthermore,

converge

to

is m a j o r i z e d

convergence

in the ideal

generated

is

for p o t e n t i a l s w i t h the above

lattice

which

that the ideal g e n e r a t e d

of all T - b o u n d e d

turn out to be c o m p l e t e

a.e.

by the

theorem

let us also remark

0

by a Doob

theorem

In c o n n e c t i o n

in the B a n a c h

it

that the g e n e r a l i z e d

of a set f u n c t i o n

of c o m p l e t e n e s s ,

by the Doob p o t e n t i a l s

0

Radon-Nikodym

and the m a r t i n g a l e

quasimartingale.

true)

is the c o n v e r g e n c e

in the next

to

convergence

of a b o u n d e d

for all set f u n c t i o n

Doob potentials.

that the g e n e r a l i z e d

of the set f u n c t i o n

But this means

will be g i v e n

function

process

converge

(and a c t u a l l y

derivatives

the m o d u l u s

discussion

is a

for the T - n o r m nor is it an

set f u n c t i o n

quasimartingales

the p o i n t w i s e

derivatives

to e x p e c t

Radon-Nikodym

potential.

of Doob p o t e n t i a l s

it is the limit of such p r o c e s s e s

of a Doob p o t e n t i a l

Radon-Nikodym

whenever

the

~ ^~

D

the set f u n c t i o n

this yields

is n a t u r a l

then

is a Doob potential.

decomposition theorem,

linear and contains

2(~A~)

is n e i t h e r

although

On the o t h e r hand, derivatives

are the

of Doob potentials.

Doob potentials, its m o d u l u s

which

are Doob p o t e n t i a l s ,

in the class of all T - b o u n d e d

2.4.10,

processes

too, and from the i d e n t i t y

I~-~1

ideal

of all

set

for the T-norm.

2.5.

A m a r t s .

If m a r t i n g a l e s and b o u n d e d s u b m a r t i n g a l e s are c o n s i d e r e d as set function processes w h i c h are r e s t r i c t i o n s of a limit m e a s u r e or m o n o t o n i c a l l y increase to a limit measure,

it is natural to go one step further and to

study set function p r o c e s s e s w h i c h c o n v e r g e to a limit measure.

A set f u n c t i o n process net

{ ~(~)

I T 6 T }

~

is an amart

(or a s y m p t o t i c martingale)

if the

is convergent. The class of all amarts is clearly

linear and contains all m a r t i n g a l e s and Doob potentials;

it then follows

from the c o r r e s p o n d i n g Riesz d e c o m p o s i t i o n theorems that the class of all amarts also c o n t a i n s the b o u n d e d submartingales, and q u a s i m a r t i n g a l e s .

For q u a s i m a r t i n g a l e s ,

supermartingales,

the b o u n d e d n e s s c o n d i t i o n

can be omitted:

2.5.1.

Theorem.

Every q u a s i m a r t i n g a l e is an amart.

Proof. k 6~

Consider a quasimartingale

~ . Fix

E 6 (0,~)

and choose

such that

T

n=k

T h e n we have,

<

I~n - Rn]~n+ I I (~) for all

r6T(k)

E

and

m£1~(T)

,

m-1 ' ~ ( ~ ) - ~ m (~) '

=

I p__Z k

(~p-Rp~m)({r=p})

I

m-1 m-1 :

p=k n=p m-1

n

<

l~n-Rn~n+11 ({~=P}) n=k p=k

This yields,

for all

<

X n=k

<

E

~, • 6 T(k)

l~n-Rn~n+11(~)

,

I

90

lu..~(n) -u.a(n) Therefore•

The

{ ~(~)

following

2.5.2. Every

I

<

J r 6 T

result

Proof.

Consider

for all

an a m a r t

o 6 T(k)

to be

but will

hence

convergent.

be u s e f u l :

~

~

. Choose

k £~

such

that

I

. Then

we have,

for all

5_

I~..~vk(n)

!

I +

k Z p=1

l~p({rAk=p}) I

_<

1 +

k X p=1

l~pl(S)

• £ T

,

- ~.~k(n) 1 + I~.~^k(n) I

,

shown.

In p a r t i c u l a r , quasimartingale

it f o l l o w s

from Theorem

2.5.1

and Lemma

the

2.5.3.

Theorem.

The c l a s s

of all b o u n d e d

Proof.

Consider

structure

amarts

a bounded

of the c l a s s

is a B a n a c h

amart

~

. Fix

of all b o u n d e d

lattice

that every

~, ~ E T ( k )

suPT(k)

~+(Q)

. By L e m m a

<

suPT(k)

2.5.2,

l~

J (~)

e 6 (0,~)

we h a v e

<

amarts:

for the n o r m

that

for all

2.5.2

is a s e m i a m a r t .

we c a n n o w d e s c r i b e

holds

net,

is a s e m i a m a r t .

lu._~(~) I

such

is a C a u c h y

is e l e m e n t a r y

l~a(n) - ~k(n) I

as w a s

}

Lemma. amart

holds

2£:

H _~ IIT

and choose

H.

IIT

k q~

.

91 hence there exists

T

holds

(n)

for all

• £ T(k)

+ ~(~)

<

T 6 T(k)

<

~(a)

For

M £ T(k)

such that

+

2£;

. Choose

,,.I. (A) +

A £ F

£:

, define a stopping

=

~) (co)

such t h a t

M

time

v 6 T(k)

I

T (co)

,

if

o~ £ A

[

(~)

,

if

0~ 6 ~ A

by letting

T h e n we h a v e +

~){(~)

<

~R (~ ) - BR ( ~ A )

=

~x(~)

- BV(~)

<

+ ]~c(O)

+

2e

+

e

+ ~T(A)

+

e

,

hence

I-¢.~(a) This yields,

+ -~(Q)

for all

I

_<

2~

o, T 6 T(k)

I

.

,

_<

+ Therefore, follows

~

is an a m a r t w h i c h

is c l e a r l y b o u n d e d .

t h a t the c l a s s of all b o u n d e d

amarts

In o r d e r to see t h a t the c l a s s of all b o u n d e d the n o r m

II. IIT , c o n s i d e r { ~(m)

of b o u n d e d

amarts

all T - b o u n d e d and

m E~

a Cauchy

From this

is a v e c t o r amarts

it

lattice.

is c o m p l e t e

for

sequence

I m 61~ }

a n d let

~

denote

set f u n c t i o n p r o c e s s e s .

its l i m i t in the B a n a c h T h e n w e have,

f o r all

l a t t i c e of o, T £ T

, l~o(n)-~T(~) I _< II ~_~(m)

iiT + l'~o(m)(n)_u(m)_r (n) I + II ~ ( m ) _ ~ iiT

Fix

e E (0,~)

, choose

m 63~

such that

<

e

,

(m) (n) I (Q) - ~x

<

II ~ - ~ ( m )

and choose

~ £ T

(m)

~o holds for all

i[T

such that

o,

T C T(~)

I~olS) - ~T(n) [

for all

o,

the vector

However,

T £ T(K) lattice

Alternatively, can be proven method

Amarts their

can be

lattice

amarts

property

the Riesz

may be characterized

amarts

the ~-norm

false;

amart,

is c o m p l e t e

of all bounded

see C h a p t e r

of t h e c l a s s

decomposition

2.5.4.

would

have

2.4.9.

of all bounded

for amarts.

For

amarts this

4.

in a s i m i l a r

process

~

, the

way

as m a r t i n g a l e s

in t e r m s

following

are equivalent:

is a n a m a r t .

(b)

There

(c)

There

lim

exists

Proof.

exists

, ~)

~6 a(F

, ~)

such that

.

holds

a measure

first

, and choose

I ~ (0) for all

~C a(F

for all 56 a(F

A6 , ~)

such that F such that

= l i m BT(n)

Suppose

e £ (0,~)

= 0

a measure

= l i m Br(A)

There ~(Q)

a measure

I~r-RT~I(~)

~(A)

(d)

exists

- ~(n)

that ~ C T

I

v, ~ E T(x)

is a n a m a r t . such that

o

need not be complete

Theorem.

(a)

that

for the T-norm.

and the T-norm

see E x a m p l e

4, S e c t i o n

a n d it f o l l o w s

limit measure:

For a set function

holds

is a b o u n d e d

if it w e r e ,

by using

of p r o o f ,

3e

~

lattice

which

the

<_

. Hence

since

to be equivalent

. Then we have

of a l l b o u n d e d

the vector

for the ~-norm

e

A C F

Consider and

A E F

, fix

of

For

o,

T 6 T(~)

, define

v(~)

stopping

times

v, ~ 6 T(M)

0 (~)

,

if

¢06 A

(OVT) (~)

,

if

CO 6 Q ~ A

T(~)

,

if

~ £ A

(ovT) (~)

,

if

~ £ Q~A

by letting

:=

and

~(~)

:=

Then we have

Therefore,

{ ~r(A)

~(A)

:=

exists

for all

A£

Again,

fix

[ r 6 T

F

and defines

e £ (0,~)

for all

Consider 6 T(T)

net,

hence

and choose

I

a measure M £ T

56a(F

, ~)

such that

<_

~, n £ T(K)

r £ T(~) by

is a C a u c h y

l i m ~T(A)

l~v(n) - ~ ( n ) holds

}

,

A6

F

and

T

n £ T(T)

. Define

a stopping

time

letting

r (~)

~(~)

,

if

¢0 6 A

:=

Then we have

for all

T 6 T(~)

,

A6

F

and

T

infinity,

l~r(A)

- ~(A) I

~

S

n £ T(T)

, hence,

letting

~

tend to

g4

This

yields

sup F

I~T(A) - 5 ( A ) I

~

T Therefore,

(a) i m p l i e s

As a corollary, measure

we obtain

is n o t

involved.

2.5.5.

Corollary.

F o r a set

function

(a)

~

(b)

lim suPT(T )

Proof. Fix

remaining

implications

a characterization This

process

of a m a r t s

is the d i f f e r e n c e

~

, the f o l l o w i n g

are obvious,

in w h i c h

property

are

a

the

limit

for a m a r t s :

equivalent:

is an amart.

Suppose

E £ (0,~)

for all

I~-RT~aI(~)

first

that

and choose

I~ v - R holds

(b). T h e

51(n) v 6 T(~)

= 0 .

~

is an a m a r t

~ £ T

~

such

limit

measure

~

.

¢

. T h e n we have,

I~ z-RT~al(~)

with

that

~

z £ T(~)

and

o 6 T(T)

I~z-R$~l(n) + IRr(Ra~-~a) l(~) I~ z - R

<

for all

2e

~l(n)

+ IRa~-~al(S)

,

hence

suPT(r) for all

z E T(~)

As a n o t h e r amart

this

this

. The converse

consequence

is b o u n d e d

deduce

I ~ T - RT~C[(~)

2~

implication

of T h e o r e m

if a n d o n l y

result

~

2.5.4,

if its l i m i t

f r o m the c o r r e s p o n d i n g

is o b v i o u s .

it is e a s y measure one

to prove

that

is b o u n d e d .

for m a r t i n g a l e s

an

We shall later

in

section.

The m a i n

interest

the

that

fact

similar

in the

it l e a d s

to the Riesz

quasimartingales.

limit

measure

to a R i e s z

decompositions

Since

amarts

of an a m a r t

decomposition for b o u n d e d

generalize

actually

for a m a r t s

comes which

submartingales

quasimartingales,

the

from is

and set

,

g5 funct i o n

processes

decomposition potentials.

and only

in the p o t e n t i a l

to

set f u n c t i o n

process

~

0 . Clearly•

if its m o d u l u s

Lemma.

If

J~J

~

{ I~TI(S)

is a p o t e n t i a l

J~J

is a potential;

lattice.

of every p o t e n t i a l

is a potential•

Doob

if the net

and every p o t e n t i a l

2.5.6.

of)

process

potential,

result:

(the d i f f e r e n c e s

will be studied now.

is a p o t e n t i a l

is a v e c t o r

following

processes

a set f u n c t i o n

potentials

The m o d u l u s

part of the Riesz

for amarts have to g e n e r a l i z e

These

A set f u n c t i o n converges

occuring

Moreover,

hence

every

~

I T £ T }

the class of all

Doob p o t e n t i a l

is a

is a b o u n d e d

amart.

is m a j o r i z e d

by a Doob potential.

then the s m a l l e s t

if

We also have

Doob p o t e n t i a l

2'

the

majorizing

satisfies

B~(A) for all

n 6~

Proof.

=

suPT(n ) JBrJ(A)

and

A £ F

Consider

~n(A)

n

a potential

~

suPT(n )

J~ J(A)

:=

,

. For

n 6~

and

A £ F

n

• define

Then each of the set f u n c t i o n s

ddn

is c l e a r l y

:

bounded

superadditive, stopp i n g

times

~n(A) and d e f i n e

Fn

> ]R

and subadditive.

consider

v, o £ T(n)

+

~n(B)

a stopping

T(~)

disjoint

:=

In o r d e r

sets

. Fix

such that

~

IBvI(A)

time

T E T(n)

+ IUoI(B)

•

if

~ £A

oho)

•

if

~CB

•

otherwise

(co)

+ ~

by letting

v(~)

(vva)

to see that

A, B 6 F n

•

~n

is also

e £ (0,~)

, choose

98 T h e n we h a v e

Cn(A) by L e m m a

2.2.1.

it f o l l o w s process

~

since

hence

~n

: 0

=

is the

smallest

following

But

~n

'

n 6~

this

means

+ ~

hence

, define

,

additive,

and

a set f u n c t i o n

satisfying

that

. Finally,

if

, t h e n we have,

suPT(n)

result

Cn(A+B)

supermartingale

ILl

ILl

~n(A)

<

,

majorizes

majorizing

+ ~

is s u p e r a d d i t i v e ,

is a p o s i t i v e

is a p o t e n t i a l .

~

I]I [(A+B)

set f u n c t i o n s

~n(~)

obviously

potential

The

the

which

L

<_

Therefore,

that

in~

which

+ Cn(B)

I~ I(A)

Doob

~

the

is a D o o b

for all

n 6~

majorizing

structure

potential

is an a r b i t r a r y

s u P T ( n ) ~T(A)

potential

describes

~ ~

and

= ILl

of the c l a s s

Doob

A £ Fn

,

~n(A) .

of all

potentials:

2.5.7.

Theorem.

The c l a s s

of all p o t e n t i a l s

Moreover,

it is a s u b l a t t i c e

amarts the

and,

smallest

Proof.

in the ideal

remarks

for the T - n o r m . following

We can n o w p r o v e

2.5.8.

the

of all

all D o o b

that

The

lattice

set

function

lattice

assertions

of a p o t e n t i a l

decomposition

II. II T of all b o u n d e d

for the n o r m

processes,

it is

of all p o t e n t i a l s

are

and

immediate

from Lemma

is the

If the a m a r t

Proof.

sum of a m a r t i n g a l e

for a m a r t s :

Consider

and a potential.

is unique.

is b o u n d e d ,

then

an a m a r t

I]~T(A) - ~(A) I

<

so is the m a r t i n g a l e .

L

that

I

with

limit

measure

5

. Choose

is

f r o m the 2.5.6.

Theorem. amart

"

potentials.

the v e c t o r

remaining

definition

the R i e s z

The decomposition

such

lattice

seen

lattice

in the B a n a c h

containing

It is e a s i l y

complete

Every

vector

is a B a n a c h

M 6T

[]

97

holds

for all

T 6 T(M)

and

I~T - RT~I(~)

hence

R ~ 6 ba(FT, ~)

because

of

for all

n 6~

set f u n c t i o n

T 6T(~)

~

!

IRnv~l(n)

the set f u n c t i o n s

which

Rn~

is a m a r t i n g a l e .

Rn~£ba(Fn,

~)

,

,

n 6~

, define

It is then c l e a r

a

that

process

Therefore,

~

has the Riesz d e c o m p o s i t i o n

Riesz

decomposition

is a potential,

sup T

l~T-~l(n)

implies

~ = ~

of

~

, where

then the set f u n c t i o n

is at the same time a s u b m a r t i n g a l e

which

. This y i e l d s

if

is an a r b i t r a r y ~

,

IRn(Rnv~)i(~)

. Therefore,

is a potential.

. Then we have

and

=

process

the set f u n c t i o n

Moreover,

2

, for all

nvM £ T(x)

IRnSl(n)

and

~

A 6 F

and

=

lim

~ = ~

~

and a potential.

l~T-~l(n)

. Therefore,

is a m a r t i n g a l e

process

=

lim

This yields

I~T-~TI(Q)

the Riesz

=

0

decomposition

,

is

unique. Finally, bounded

2.5.9.

if the a m a r t

~

is bounded,

since e v e r y p o t e n t i a l

then the m a r t i n g a l e

is bounded.

~ = ~- ~

is Q

Corollary.

For an a m a r t

~

and its limit m e a s u r e

(a)

~

is bounded.

(b)

~

is bounded.

~

, the f o l l o w i n g

are equivalent:

98 Proof.

By the Riesz decomposition,

if its m a r t i n g a l e part is bounded.

an amart is b o u n d e d if and only

Since the limit m e a s u r e of an amart

is identical w i t h the limit m e a s u r e of its m a r t i n g a l e part, the a s s e r t i o n follows f r o m T h e o r e m 2.3.2.

u

It should be noted, however, e x t e n d to amarts. the T-norm;

that not all a s s e r t i o n s of T h e o r e m 2.3.2

Even for q u a s i m a r t i n g a l e s ,

see Example 2.4.9. F u r t h e r m o r e ,

the~-norm

may d i f f e r from

the T - n o r m of a n o n t r i v i a l

p o t e n t i a l c e r t a i n l y differs from the n o r m of its limit m e a s u r e w h i c h is equal to zero.

Before p a s s i n g to the amart c o n v e r g e n c e theorem, we include a n o t h e r c o n s e q u e n c e of the Riesz d e c o m p o s i t i o n w h i c h shows that the usual d e f i n i t i o n of an a m a r t is e q u i v a l e n t to C h a t t e r j i ' s condition:

2.5.10.

Corollary.

For a set f u n c t i o n p r o c e s s

2 , the f o l l o w i n g are equivalent:

(a)

~

is an amart.

(b)

There exists a m a r t i n g a l e satisfying

Proof.

If

2

is an amart, define

by the limit m e a s u r e of

if

2

Doob p o t e n t i a l potential.

2'

Hence

= (~-~) + ~

and a Doob p o t e n t i a l

~

2 , and define

m a j o r i z i n g the p o t e n t i a l Conversely,

~

2,

I ~ - ~I < ~'

I~- ~

to be the m a r t i n g a l e induced 2'

to be a Doob p o t e n t i a l

I.

is such that there exists a m a r t i n g a l e satisfying 2- ~

I~- ~I < ~'

is a potential,

, then

1 2 - ~I

~

and a is a

and it follows that

is an amart.

It is r e m a r k a b l e that the a b o v e c h a r a c t e r i z a t i o n y i e l d s an e q u i v a l e n t d e f i n i t i o n of amarts in w h i c h s t o p p i n g times n e e d not be used. This is due to the fact that m a r t i n g a l e s and Doob p o t e n t i a l s may be d e f i n e d w i t h o u t u s i n g s t o p p i n g times;

see T h e o r e m 2.3.1 and T h e o r e m 2.4.1.

Let us now prove the a m a r t c o n v e r g e n c e theorem.

Due to the Riesz

d e c o m p o s i t i o n for amarts and the m a r t i n g a l e c o n v e r g e n c e theorem,

it is

s u f f i c i e n t to prove the c o n v e r g e n c e of the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s of a p o t e n t i a l in order to prove the c o n v e r g e n c e of the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s of a b o u n d e d amart.

The c o n v e r g e n c e of the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s of a p o t e n t i a l can be o b t a i n e d f r o m a m a x i m a l i n e q u a l i t y w h i c h we shall

99

prove now.

For all

n E~

, let

Cn :

~_n

d e n o t e the o - a l g e b r a g e n e r a t e d by

b a ( F n, ~)

Fn , let

> b a R n l ( F n , ~)

denote the b a n d p r o j e c t i o n g u a r a n t e e d by T h e o r e m 2.1.4, and let

Jn

:

bca(Fn' ~)

~ ca(Fn' m)

denote the e x t e n s i o n o p e r a t o r given by T h e o r e m 2.1.6. For each set function process

~

on

[

, we then o b t a i n a set f u n c t i o n

process

:=

{ JnCn~n

on the stochastic basis Let

T

I n E~

}

[ := { ~n

I n E~

} .

denote the class of all b o u n d e d stopping times for

~

.

The proof of the a n n o u n c e d m a x i m a l i n e q u a l i t y will be b a s e d on the f o l l o w i n g t e c h n i c a l lemma:

2.5.11. If

~

Lemma. is a set f u n c t i o n process on

sUP~T(k ) holds for all

kE~

I~I(S)

!

suPT(k)

[

, then

I~TI(n)

.

Proof.

W i t h o u t loss of generality, we m a y and do a s s u m e

Consider

~ ET

and d e f i n e

m

N o w define

B1

:=

GI

:=

and

choose

A 1E F1

{~=1}

,

such that

IP.j I ( G I ~ 1 )

<_ Cm-2

:= m a x ~ {(~)

. Fix

e E (0,=)

k = I

100

holds

for all

j E {1•2, .... m}

DI

:=

BI n AI

=

, and define

AI

T h e n we h a v e

{~=1}

S

(GIAA I ) U D I

,

hence

I~11({~=1}) For A

P

E F

pE {2,3,...,m} and

P

D

B

E F

P

~

cm-1 + lUlI(D 1)

, define

inductively

, as f o l l o w s :

P p-1

:=

U

P

j=1

sets

B p E Fp

Define

Ac ]

and

Gp choose

A

::

E F P

{~:p} N Bp such that

P l~j I (GpAAp)

holds

for all

D

G

:=

Therefore•

em -2

P

we o b t a i n

G

AD P

c _

, and define

NA

B

P

c B p -- p Gp

<

j E {p,p+1,...,m}

P From

•

c G AA , hence P -- p P

(GpAAp) U D P

we h a v e {~:p}

:

p-1 X j:l

c

( p;1

--

j:1

c

-

{~:p} N Bj h A . + {~:p} 0 B 3 P

1

GCND

(P

U

j=1

]

G .~ A A .

J

]

U G P

)

U Dp

'

,

GpEFp

101

hence l~pl({~=p})

~

em -I + l~pl(Dp)

Since the sets D , p £ {I,2,...,m} , are mutually disjoint, P define a stopping time T 6 T by letting

x(~)

p

,

if

~ E Dp

m

,

if

0~6~

I~I(~)

~

e + IUTI(~)

From this the assertion

~

~ D p=1 p

yields

~

e + suPT

IUT](~)

follows.

We can now prove the maximal

If

m

:=

Summing up the above inequalities

2.5.12.

we can

inequality:

Lemma. is a set function process,

then

~(J I) ( { s u ~ ( k ) IDn~nl > E}) holds for all Proof.

e £ (0,~)

k 6~

suPT(k ) I ~ I (Q)

.

Define

Ak and, for all

An For each

and

~

=

n 6~(k+I)

:=

m £~(k)

m

This yields

{Ivk~l>E}

(~)

C

;k

,

{ lDn~ nl > ~} n

n 1{ ) ~ IDp~pl < E } p=k

, define a stopping

time

n

,

if

~£ An

m

,

if

~6~

:=

6

{m 6 T(k)

and m Z A n=k n

Fn by letting

k < n < m

102

(~_)

m

¢(J l)

An

=

c

Z n=k

n-k

(JnRn l) (An )

m I

--< nZ--k A IDn~nl d(JnRnl) n m :

I~nl (A n)

~-

n=k

m

suPT(k) by Lemma 2.5.11. Letting

m

l~Ti(n)

,

tend to infinity, we obtain

~(J A ) ( { s u b ( k ) , D n ~ n l

> ¢})

=

E(J l)( ~

An)

\n=k

suPT(k)

IBTI(Q)

,

as was to be shown. From this maximal inequality, easily deduced: 2.5.13. If

~

theorem is

Theorem. is a potential, lim Dn~ n

Proof.

the potential convergence

Fix

0

a.e.

e, 6 £ (0,~)

suPT(k) Now the maximal

=

then

IUTI(~)

and choose ~

k £~

such that

e6

inequality yields

(J A) ( { s u b ( k } IDn~nl > E})

<

6

,

from which the assertion follows. By the Riesz decomposition

for amarts and the linearity of the

103

generalized

Radon-Nikodym

theorem is a consequence potential

convergence

2.5.14

Corollary.

If

~

By Corollary

2.5.15. ~

=

2.5.10,

in the following

the following

of the m a r t i n g a l e

amart c 0 n v e r ~ e n c e

convergence

theorem and the

theorem:

is a bounded amart,

lim Dn~ n

If

operators,

then

D~ lim ~n

a.e.

the amart convergence

theorem may also be stated

form:

Corollary. is an ~ - b o u n d e d

martingale

~

set function process

and a Doob potential

lim DnB n

=

D

lim ~n

~'

such that there exists a

satisfying

I~- ~I < ~'

, then

a.e.

In f a c t , this is the earliest form in which the amart convergence theorem was stated;

see Chatterji

[35; Theorem 2]. A l t h o u g h no stopping

times at all are needed in the formulation of C o r o l l a r y remarks following Corollary its proof.

It may be interesting

of Corollary Proof.

Xn and choose

lim ~n

=

0

lim

~

has to be bounded.

lim Dn5 n = D (~n-~n)

lim 5n

:=

a.e.

~, 6 6 (0,~)

simple functions

IXn-Znl d(JnRnl) and choose

k 6~

Z

n

< such that

Since

sufficient to prove

D n ( B n - ~ n)

F -measurable n

Now the

a.e.

= 0 . Thus we obtain

" It is therefore

, define

n~1 ~Q Fix

we have

lim ~n = D

lim D n ( ~ n - ~ n) n C~

in

to include the following direct proof

theorem yields

is a Doob potential,

For all

(see the

2.5.15.

convergence

lim Dn5 n = D

2.5.15

they seem to be indispensable

First note that the m a r t i n g a l e

martingale ~'

2.5.10),

such that

104

~.~.(s)

<_ ~8

and Z n=k It follows

IXn-Zn I d (JnRnl)

<

e6

~

exactly lim

as in the proof of Theorem

(Xn-Z n)

=

0

2.3.8 that

a.e.

Now define

:= and,

for all

{IZk[ > e}

n £~(k+I)

q

Fk

,

/n-1 An For all

:=

m £~(k)

Tm(~)

Thisyields,

>

{[Znl > e } NkpZ__k{[Zp[_<e} , define a stopping

time

,

if

~EA n

and

m

,

if

~ E ~~

m Z An n=k

E (J A) < n L

mq~(k)

An>

=

C

m~-

k ~ n ~ m

(JnRnl) (An)

n=k

mf IZnl nZ--k A

°I <

by letting

,

=

<

Fn

r m 6 T(k)

n :=

for all

6

d (JnRnA)

n

n--Zk A

ml ~Zn-Xnl

IXnl

d(JnRn ~) + nZ__k A

n

n

m

_<

~8 +

Z n=k

IBnl (An )

~6 + I~ml(~)

<

e8

+

~.~'

(n) m

_<

~6

+

~(~)

<

2,~6

,

d (JnRnl)

105

by T h e o r e m

2.4.1.

Letting

m

(J l ) ( { s u ~ ( k ) , Z n , which

t e n d to i n f i n i t y ,

>e})

=

we obtain

(J l)( ~ A n ) n=k

<

26

,

implies

lim Z

Therefore,

n

=

0

a.e.

=

0

a.e.

we h a v e

lira X

n

as was to be shown.

,

[]

2.6.

S e m i a m a r t s .

Semiamarts

were

encountered

chapter,

in p a r t i c u l a r

function

processes.

own

sake,

and

potentials.

Riesz

Semiamarts

times

section,

properties

The m a i n

(non-unique)

2.6.1.

In this

their

characterization

several

in the c o n t e x t

result

are

semiamarts

compared

are

for

sections

studied

those

de S n e l l

semiamarts

of t h i s

properties

are

with

is the e n v e l o p p e

decomposition

of a m a r t s

in e a r l i e r

of b o u n d e d n e s s

of set

for

their

of a m a r t s

and

from which

as w e l l

a

as a f u r t h e r

deduced.

may be characterized

as f o l l o w s :

Theorem.

F o r a set f u n c t i o n (a)

~

(b)

For

process

~

, the

following

are equivalent:

is a s e m i a m a r t . all

M £ T

, the

family

that

~

{ ~T(A)

I ~ £ T(~)

and

A6

F

is b o u n d e d .

Proof. For

Suppose

• E T(M)

first

and

A £ F

is a s e m i a m a r t .

, define

a stopping

Consider

time

v 6 T(~)

T £ T by

. letting

M

=

I

~ (~)

'

if

~ £A

(~)

,

if

~ £ ~A

[ T h e n we h a v e

I~T(A) I <_ I~(~)I for all

r £ T(x)

and

+ I~(~A) I

<

suPT

l~v(~)l + lull(n)

A C F M

The converse

Similar

is o b v i o u s .

to a m a r t s ,

2.6.2.

we have

(a)

~

(b)

The

and

A £ FT

property

for

semiamarts:

Theorem.

F o r a set f u n c t i o n

Proof.

a difference

process

~

, the

following

are

equivalent:

is a s e m i a m a r t . value

Suppose

suPT

first

, define

suPT(r )

that

stopping

~

[~T-R~a[(~)

is a s e m i a m a r t .

times

9, ~ C T(T)

is finite.

For by

• E T

letting

,

aET(~)

107

v(~)

T (co)

,

if

~ 6 A

O(c0)

,

if

co 6 ~ A

o(~)

,

if

~ £ A

T(~)

,

if

~ £ ~kA

:=

and

~(~)

:=

Then we have

(~ -R ~o) (A) - (~T-RT~o) (n~A)

=

~V(Q)

- ~n(~)

2 suPT for all

T £ T ,

o C T(T)

and

I~ T - RT~OI(n) for all

T £ T

and

~

A E F

T

2 suPT

o £ T(T)

l~(n) I

<

~

2 SuPT

l~x(n) I

<

if the v a l u e

sup T suPT(T) is finite,

, hence

, which yields

suPT s u P T ( T ) I~T-RT~oI(n) Conversely,

IBx(Q) I

I~T-RT~oI(~)

t h e n we h a v e

IB 1(n) - B~(Q) I

<_

SuPT(1)

I~I-RI~cl (~)

<

~

IlLI(~) l + suPT(1 ) IBI-RIBol (~)

<

,

hence

IBM(~) I for all

_<

x £ T = T(1)

. Hence

~

is a s e m i a m a r t .

The m a i n r e s u l t of this s e c t i o n

is the e n v e l o p p e

w h i c h we s h a l l p r o v e now:

de S n e l l

for s e m i a m a r t s

108 2.6.3.

Theorem.

Every semiamart is m a j o r i z e d by a s u p e r m a r t i n g a l e and m i n o r i z e d by a submartingale. If

~

is a semiamart,

then the smallest s u p e r m a r t i n g a l e

_~ m a j o r i z i n g

satisfies

~n(A)

=

suPT(n ) ~T(A)

and the largest s u b m a r t i n g a l e

~n(A) for all

n EI~

= and

~

satisfies

,

A E F

n bounded,

if

Proof.

Consider a semiamart

:=

minorizing

Br (A)

Moreover,

~n(A)

is

infT(n)

~

suPT(n)

then

so are

~ . For

_~

and

n E~

_~ .

and

A E Fn , d e f i n e

BT (A)

By T h e o r e m 2.6.1, each of the set functions

~n

is bounded,

and it is

also additive, w h i c h can be seen by using a stopping time a r g u m e n t as in the proof of Lemma 2.5.6. Therefore, deffne a set function process . Again,

~

the set f u n c t i o n s

~n

'

n 6~

,

w h i c h is a s u p e r m a r t i n g a l e m a j o r i z i n g

it can be seen as in the proof of Lemma 2.5.6 that

the smallest s u p e r m a r t i n g a l e m a j o r i z i n g

~

is

~ .

In order to c o n s t r u c t the largest s u b m a r t i n g a l e m i n o r i z i n g

~

, it is

s u f f i c i e n t to c o n s i d e r the smallest s u p e r m a r t i n g a l e m a j o r i z i n g The final a s s e r t i o n c o n c e r n i n g b o u n d e d n e s s

-~ .

is obvious.

[]

The f o l l o w i n g r e s u l t d e s c r i b e s the s t r u c t u r e of the class of all b o u n d e d semiamarts:

2.6.4.

Theorem.

The class of all b o u n d e d s e m i a m a r t s is a Banach lattice for the n o r m [[. [IT . Moreover,

in the v e c t o r lattice of all set f u n c t i o n processes,

it is the smallest ideal c o n t a i n i n g all b o u n d e d submartingales. Proof.

A p p l y T h e o r e m 2.2.4, T h e o r e m 2.2.5, and T h e o r e m 2.6.3.

The ideal p r o p e r t y of the class of all b o u n d e d s e m i a m a r t s T - b o u n d e d set f u n c t i o n processes)

(or: all

should be c o m p a r e d w i t h the ideal

p r o p e r t y of the class of all potentials.

109 The enveloppe de Snell for semiamarts

yields another c h a r a c t e r i z a t i o n

of amarts: 2.6.5. If

Corollary.

~

is a semiamart with smallest m a j o r i z i n g

largest minorizing

submartingale

(a)

~

(b)

lim ~n = lim ~n "

Proof.

Suppose first that

supermartingale

and

is an amart.

~

is an amart. By Corollary

there exists a m a r t i n g a l e

~

IB- ~I < B' . Then

is a supermartingale

- B'

~

~ , then the following are equivalent:

~ + B'

and a Doob potential

is a submartingale m i n o r i z i n g

lim ~n

=

lim

~'

2.5.10•

satisfying

majorizing

~ , and

~ . This yields

(~n - Bn)

lim ~n lim ~n lim

(~n + ~n)

=

lim ~n

'

hence

lim ~n Conversely•

=

lim ~n

suppose that

lim ~n = lim ~n

holds.

For all

A q F

define

~(A) Then

~

lim ~n(A)

is an additive A ~n

hence

:=

<-- Rnfi <

Rn~£ba(Fn,

function process

~) ~

positive potentials• majorizing a potential•

i~-~i

=

lim ~n(A)

set function. V ~n

Moreover,

n 6~

, we have

'

. Therefore•

the restrictions

of

hence

is a positive potential

. Now it follows

and

define a set

Then

(~- 5) v ( ~ - ~ )

~ - ~

~

which is a martingale.

from Theorem 2.5.7 that

from which it follows that

as was to be shown,

for all

~ = (B - ~) + ~

~ - ~ ~- ~

are is

is an amart, o

110 The

enveloppe

2.6.6. Every

de S n e l l

yields

a Riesz

decomposition

for

is the

Consider

supermartingale

sum of a m a r t i n g a l e

and a bounded

semiamart.

~

a semiamart

~

~(A)

. F o r all

~

2.6.5

in

, ~)

of

~

martingale.

Then

the

set f u n c t i o n

a n d we h a v e

to s h o w t h a t

Fn

, choose

~(A)

~

, and

Rn~£ ba(Fn, ~)

the r e s t r i c t i o n s

A£

smallest

define

2"

in can b e s e e n

as in the p r o o f

holds

n 6~

a set f u n c t i o n process

is b o u n d e d .

~, ~ E T(n)

~(A)

majorizing

, define

.

a(F

that

with

A £ F

v l i m ~n(A)

:=

is a m e a s u r e

of C o r o l l a r y

and

semiamarts:

Theorem. semiamart

Proof.

Then

also

such

for all process

2"

:= ~ - ~

To this

end,

~

. Therefore,

which

is a

is a s e m i a m a r t , consider

n C~

that

+ I

and

~(n~A)

and define

~

stopping

~(~A)

+ I

times

g,

n a(~)

,

T E T(n)

by

,

if

c06A

(co)

,

if

c0 £ Q ~ A

~ (co)

,

if

~ £ A

n

,

if

co £ ~ A

letting

:=

and

z(~)

:--

T h e n we h a v e

(~n-Rn~) (A) -

(~n-Rn~) ( ~ A )

<

~g(~)

2 suPT

for all

n E~

and

AC

Fn

• Therefore,

2"

- ~T(~)

+ 2

[~(~)

[ + 2

is b o u n d e d ,

,

a

111

Instead of using the smallest m a j o r i z i n g

s u p e r m a r t i n g a l e for g e n e r a t i n g

the m a r t i n g a l e of a Riesz d e c o m p o s i t i o n for a semiamart, use its largest m i n o r i z i n g submartingale. least two

(and thus i n f i n i t e l y many)

Therefore,

one can also

a semiamart has at

d i f f e r e n t Riesz d e c o m p o s i t i o n s

w h e n e v e r the limits of the smallest m a j o r i z i n g s u p e r m a r t i n g a l e and the largest m i n o r i z i n g s u b m a r t i n g a l e are d i f f e r e n t from each other. By C o r o l l a r y 2.6.5, this is the case for every s e m i a m a r t w h i c h is not an amart.

F r o m the Riesz d e c o m p o s i t i o n for semiamarts, we o b t a i n a n o t h e r c h a r a c t e r i z a t i o n of s e m i a m a r t s w h i c h is similar to a c h a r a c t e r i z a t i o n of amarts

(Corollary 2.5.10):

2.6.7.

Corollary.

For a set function process

~

, the f o l l o w i n g are equivalent:

(a)

~

is a semiamart.

(b)

There exists a m a r t i n g a l e satisfying

Proof.

semiamart.

and a s u p e r m a r t i n g a l e

i~ - ~i < ~'

Suppose first that

decomposition,

~

is a semiamart.

choose a m a r t i n g a l e

~

such that

By the Riesz ~-

By T h e o r e m 2.6.4, the set function process

b o u n d e d semiamart. Now apply T h e o r e m 2.6.3 and define smallest s u p e r m a r t i n g a l e m a j o r i z i n g

i~- 5l

The c o n v e r s e is obvious from T h e o r e m 2.6.4.

is a b o u n d e d I~- ~ ~'

is

a

to be the

2.7.

R e m a r k s .

F r o m the lattice t h e o r e t i c a l point of view,

it is c o n v e n i e n t to define

certain p r o p e r t i e s of b o u n d e d m e a s u r e s in terms of their variations. The a d v a n t a g e in doing this is due to the fact that the v a r i a t i o n of a b o u n d e d m e a s u r e is identical w i t h its modulus and also is a m e a s u r e w h i c h is positive.

In this way, we have d e f i n e d ~ - c o n t i n u i t y and

~ - s i n g u l a r i t y of a b o u n d e d measure. Also, by T h e o r e m 2.1.5, c o u n t a b l e a d d i t i v i t y of a b o u n d e d m e a s u r e may be d e f i n e d in terms of its variation. A n o t h e r example will be given below.

Our d e f i n i t i o n s of ~ - c o n t i n u i t y and ~ - s i n g u l a r i t y are e q u i v a l e n t to those given by B o c h n e r and P h i l l i p s

[23] and Darst

[45], who p r o v e d the

L e b e s g u e d e c o m p o s i t i o n for b o u n d e d measures. While B o c h n e r and Phillips u s e d lattice t h e o r e t i c a l arguments,

Darst's proof is a purely m e a s u r e

theoretic one. For c o u n t a b l y a d d i t i v e measures,

a lattice t h e o r e t i c a l

proof of the L e b e s g u e d e c o m p o s i t i o n was given by Yosida

[133].

A measure

~ = 0

~ 6 ba(F, ~)

for each m e a s u r e

is purely f i n i t e l y additive if

~ £ b c a ( F , ~)

satisfying

l~l ~

holds

i~i . It is not hard

to see that the class of all purely f i n i t e l y a d d i t i v e m e a s u r e s on is identical w i t h

bca(F, ~ ) ±

2.1.4, it can be p r o v e n that the class a p r o j e c t i o n b a n d in of

bca(F, ~)

and

ba(F, ~) bca(F, ~ ) ±

F

° A l o n g the lines of the proof of T h e o r e m bca(F, ~ ) ±

, and that

is an A L - s p a c e and

ba(F, ~)

is the direct sum

. This is the Y o s i d a - H e w i t t d e c o m p o s i t i o n

w h i c h was first stated by W o o d b u r y [130].

W o o d b u r y also gave a sketch of

a proof, while the first c o m p l e t e proof was given by Y o s i d a and Hewitt [134].

The Y o s i d a - H e w i t t d e c o m p o s i t i o n was u s e d by C h a t t e r j i

[35,36]

in order

to c o n s t r u c t the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e of a b o u n d e d a d d i t i v e set function.

In C h a t t e r j i ' s construction,

the Y o s i d a - H e w i t t

d e c o m p o s i t i o n serves to reduce the p r o b l e m to the c o u n t a b l y a d d i t i v e case in w h i c h the c l a s s i c a l L e b e s g u e d e c o m p o s i t i o n can be applied. Due to the L e b e s g u e d e c o m p o s i t i o n for b o u n d e d a d d i t i v e set functions, the Y o s i d a - H e w i t t d e c o m p o s i t i o n is not n e e d e d in the c o n s t r u c t i o n of the g e n e r a l i z e d R a d o n - N i k o d y m derivative.

The lattice t h e o r e t i c a l and more

direct c o n s t r u c t i o n given in Section 2.1 also reveals the c h a r a c t e r i s t i c p r o p e r t i e s of the g e n e r a l i z e d R a d o n - N i k o d y m o p e r a t o r w h i c h are important but not obvious from C h a t t e r j i ' s approach.

113 In the c o u n t a b l y a d d i t i v e case, the idea of c o n s t r u c t i n g a g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e of a m e a s u r e goes back to A n d e r s e n and Jessen [1,2]. Using g e n e r a l i z e d R a d o n - N i k o d y m derivatives,

they proved the

c o n v e r g e n c e of a real m a r t i n g a l e and also o b t a i n e d the i d e n t i f i c a t i o n of its limit. The results of A n d e r s e n and J e s s e n w e r e e x t e n d e d by J o h a n s e n and K a r u s h

[85,86], Rao

[107], L a m b

[90], and others. C h a t t e r j i

[35,36]

was the first to study the f i n i t e l y a d d i t i v e case. For further c o m m e n t s on the g e n e r a l i z e d R a d o n - N i k o d y m derivative,

see C h a p t e r I.

The m o s t i n t e r e s t i n g set f u n c t i o n p r o c e s s e s are c e r t a i n l y those w h i c h arise from i n t e g r a t i n g a stochastic process. F r o m this, it is easy to u n d e r s t a n d the d e f i n i t i o n s and p r o p e r t i e s of a stopped set function process and the r e s t r i c t i o n of a m e a s u r e as b e i n g the c o u n t e r p a r t s , on the level of expectations,

of a stopped s t o c h a s t i c process and the

c o n d i t i o n a l e x p e c t a t i o n of a r a n d o m variable. W h i l e those set f u n c t i o n processes, w h i c h arise from i n t e g r a t i n g a stochastic process, c o n s i s t of m e a s u r e s which are c o u n t a b l y a d d i t i v e and even a b s o l u t e l y c o n t i n u o u s with respect to the u n d e r l y i n g p r o b a b i l i t y measure, for general set function processes.

this is not r e q u i r e d

For this reason, certain p r o p e r t i e s

of set function p r o c e s s e s are easier to obtain than the c o r r e s p o n d i n g ones for stochastic processes. A typical example of this kind is the Riesz d e c o m p o s i t i o n for amarts.

Roughly speaking,

structure p r o p e r t i e s

of set function p r o c e s s e s are easier to prove than those of stochastic processes, whereas

some more effort is n e e d e d for p r o v i n g c o n v e r g e n c e

theorems.

A l t h o u g h the d e f i n i t i o n of a m a r t i n g a l e as given in Section 2.3 is not the c l a s s i c a l one,

it is the a p p r o p r i a t e one in the c o n t e x t of amart

theory, and it also seems to be the m o s t c o m p r e h e n s i b l e one if m a r t i n g a l e s are looked at as b e i n g fair games. The gain of g e n e r a l i t y in m a r t i n g a l e theory, w h e n c o m p a r e d w i t h the theory of sequences of c o n d i t i o n a l e x p e c t a t i o n s , b e c o m e s clear from the L e b e s g u e d e c o m p o s i t i o n for b o u n d e d martingales. given by C h a t t e r j i

This L e b e s g u e d e c o m p o s i t i o n was i m p l i c i t l y

[35,36]; see also B a e z - D u a r t e

[4] for the L e b e s g u e

d e c o m p o s i t i o n for m a r t i n g a l e s w i t h a c o u n t a b l y a d d i t i v e limit measure, and N e v e u

[100] for a c o m p o n e n t w i s e L e b e s g u e d e c o m p o s i t i o n .

The latter

result a l s o indicates that the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s of a m a r t i n g a l e of m e a s u r e s n e e d not form a m a r t i n g a l e of r a n d o m variables. The proof of the m a r t i n g a l e c o n v e r g e n c e t h e o r e m given here is due to Chatterji

[35,36].

In the real case,

s u b m a r t i n g a l e s and s u p e r m a r t i n g a l e s are the m o s t

114

obvious g e n e r a l i z a t i o n s of martingales.

In a sense, the step from b o u n d e d

m a r t i n g a l e s to b o u n d e d s u b m a r t i n g a l e s is the essential one in e x t e n d i n g the class of all b o u n d e d m a r t i n g a l e s :

The b o u n d e d q u a s i m a r t i n g a l e s are

then o b t a i n e d as the set f u n c t i o n p r o c e s s e s in the linear hull of the b o u n d e d submartingales,

the p o t e n t i a l s are o b t a i n e d as the set f u n c t i o n

p r o c e s s e s in the ideal g e n e r a t e d by the D o o b potentials,

and the class

of all b o u n d e d amarts is identical w i t h the v e c t o r lattice g e n e r a t e d by the b o u n d e d m a r t i n g a l e s and potentials. Also,

the ideal g e n e r a t e d by the

b o u n d e d s u b m a r t i n g a l e s c o i n c i d e s with the class of all b o u n d e d semiamarts (or T - b o u n d e d set f u n c t i o n processes).

F u r t h e r results on s u b m a r t i n g a l e s

may be found in Chapter 4, Section 3.

Q u a s i m a r t i n g a l e s were i n t r o d u c e d by Fisk Orey

[102] and Rao

[70]. They were also studied by

[106]. The d e c o m p o s i t i o n of a b o u n d e d q u a s i m a r t i n g a l e

into the d i f f e r e n c e of two p o s i t i v e s u p e r m a r t i n g a l e s is due to Rao see also S t r i c k e r

[106];

[122]. The lattice p r o p e r t y of the class of all b o u n d e d

q u a s i m a r t i n g a l e s was first p r o v e n by Y o e u r p

[132] and later by J e u l i n

[84], who u s e d a lattice t h e o r e t i c a l argument. for q u a s i m a r t i n g a l e s ,

In the Riesz d e c o m p o s i t i o n

the b o u n d e d n e s s c o n d i t i o n can be omitted. We thus

have the f o l l o w i n g Riesz d e c o m p o s i t i o n for general q u a s i m a r t i n g a l e s : 2.7.1.

Theorem.

Every q u a s i m a r t i n g a l e is the sum of a m a r t i n g a l e and the d i f f e r e n c e of two Doob potentials.

Proof.

Since every q u a s i m a r t i n g a l e is an amart,

m a r t i n g a l e and a potential, quasimartingale.

it is the sum of a

by T h e o r e m 2.5.8. But this p o t e n t i a l is a

Since every p o t e n t i a l is bounded,

the Riesz d e c o m p o s i t i o n

for b o u n d e d q u a s i m a r t i n g a l e s can be a p p l i e d to the potential. F r o m this the a s s e r t i o n follows,

a

A m a r t t h e o r y e m e r g e d from a n u m b e r of papers c o n c e r n i n g e x t e n s i o n s of the m a r t i n g a l e c o n v e r g e n c e theorem. The first results on amarts of random v a r i a b l e s c o n c e r n e d amarts w i t h an integrable supremum; Mertens

[92], and Baxter

v a r i a b l e s started w i t h the w o r k of Austin, and Chacon [56,57];

see M e y e r

[93],

[5]. The general theory of amarts of r a n d o m Edgar, and Ionescu Tulcea

[3]

[32]. The t e r m "amart" was i n t r o d u c e d by Edgar and S u c h e s t o n

see also S u c h e s t o n

[123]. As r e m a r k e d in C h a p t e r I, the general

theory of amarts of m e a s u r e s started e a r l i e r than the general theory of amarts of r a n d o m variables. [35,36] and Lamb

It dates b a c k to the p a p e r s by C h a t t e r j i

[90], a l t h o u g h these authors did not work e x p l i c i t l y

w i t h b o u n d e d s t o p p i n g times.

In the f o r m of C o r o l l a r y 2.5.15, the a m a r t

115

c o n v e r g e n c e t h e o r e m is due to C h a t t e r j i

[35,36] who also gave a sketch of

its proof. Our direct proof of C o r o l l a r y 2.5.15 is b a s e d on C h a t t e r j i ' s arguments.

In C h a t t e r j i ' s proof, however,

the stopping time a r g u m e n t

is missing. His proof is thus incomplete, but not really incorrect, as r e g r e t t a b l y stated in

[113,117]. C o r o l l a r y 2.5.10, w h i c h yields the

e q u i v a l e n c e of C h a t t e r j i ' s result and the amart c o n v e r g e n c e theorem, is due to G h o u s s o u b and S u c h e s t o n o b s e r v e d in

[75]. This e q u i v a l e n c e was first

[113,117]. The proof of the a m a r t c o n v e r g e n c e t h e o r e m given

here is taken from

[117].

For amarts of r a n d o m variables,

the c o n v e r g e n c e t h e o r e m was p r o v e n by

Austin, Edgar, and Ionescu Tulcea

[3] and Chacon

[32]. For further

results and proofs related to the a m a r t c o n v e r g e n c e theorem, Baxter

[6], B e l l o w

and D v o r e t z k y

[13,14], B e l l o w and D v o r e t z k y

[16], Chen

see also [38,39,40],

[52,53]. The first e x p o s i t o r y paper on amarts is that of

Edgar and S u c h e s t o n

[57]; see also

[56,123].

S t a b i l i t y p r o p e r t i e s of amarts were a l r e a d y d i s c u s s e d by Austin, Edgar, and Ionescu Tulcea

[3], Edgar and S u c h e s t o n

[56,57], and B e l l o w

[8,9].

The proof of the lattice p r o p e r t y of the class of all b o u n d e d amarts given in Section 2.5 does not rely on the Riesz d e c o m p o s i t i o n . on the Riesz decomposition,

however,

see C h a p t e r 4, Section 4. B e l l o w

Based

a more elegant proof can be given;

[8,9] also gave c o n d i t i o n s under w h i c h

a c o n t i n u o u s f u n c t i o n t r a n s f o r m s b o u n d e d amarts into b o u n d e d amarts.

A different, but t y p i c a l l y stochastic type of s t a b i l i t y is the stability of amarts u n d e r o p t i o n a l s t o p p i n g and o p t i o n a l sampling.

The f o l l o w i n g

result is the o p t i o n a l stopping t h e o r e m for amarts:

2.7.2. If

~

Theorem. is an amart and

function process basis Proof.

[*

2"

:= { Fn^ O Let

T*

I nE~

times

I n E~

}

is an amart on the stochastic

} .

F* . Fix

~, n q T(k)

v, T E T(k)

is an a r b i t r a r y stopping time, then the set

d e n o t e the class of all b o u n d e d stopping times for

the stochastic basis

holds for all

a

:= { ~ n ^ o

. For

by letting

c £ (0,~)

and choose

v*, T* £ T*(k^u)

k E~

such that

, define stopping

116

v(~)

:=

p

,

if

~ 6 {v*=pAO}

T(~)

:=

p

,

if

~E

and

Then we

we

have

~*

= ~AO

and

{r*=pAO}

r*

= ~AO

<

~)* (CO)

. Moreover,

for

all

~ £ {k>a}

have

O(CO)

:

(kAo) (CO)

:

(VAO) (CO)

by

letting

<

O(CO)

,

hence

(VAO)(~) and

=

C(CO)

=

c(~o)

,

similarly

( T ^ o ) (co)

Now

define

stopping

x(~)

times

M,

n £ T(k)

(VAO) (CO)

,

if

CO £ {k
k

,

if

~ £ {k>o}

(~AO) (~)

,

if

~ E {k
k

,

if

~ E {k>a}

:=

and

~(~)

Then

we

:=

have

l~v.(n) -uT.(Q) I

<_

I~VAo({k
<

as

was

to

be

shown.

~

,

--~I Ao({k<_o}) I

[~^o({k>o})

- ~TAo({k>c})

[

,

117 We also h a v e the f o l l o w i n g o p t i o n a l samplin 9 t h e o r e m for amarts:

2.7.3. If

~

Theorem. is an amart and

{ ~n E T(n)

I n 6~

}

is an increasing sequence

of b o u n d e d stopping times, then the set f u n c t i o n p r o c e s s ~*

:= { ~T

F* := { F n -T n Proof.

I n E~

}

I n E~

} .

Let

T*

denote the class of all b o u n d e d stopping times for

the stochastic basis

I~.

~* £ T*(T k)

holds for all

E £ (0,~)

and c h o o s e

k E~

such that

_<

~, n C T(k)

{~*=p}

, we h a v e

=

~* E T(k)

Z {v*=Tn}n{rn= p} n=k

p E~

I~o.(~) for all

F* . Fix

(~) - ~.Tc(~) I

holds for all For all

is an amart on the s t o c h a s t i c basis

since

6

F P

. Therefore, we have

-l~T.(n)

I

<_

~

,

a*, T* £ T*(T k)

The g r o w t h c o n d i t i o n

T

£ T(n) , for all n E ~ , can be o m i t t e d in the n case of amarts of r a n d o m variables, but a p p a r e n t l y it c a n n o t be r e m o v e d for amarts of measures. N e v e r t h e l e s s , the Riesz d e c o m p o s i t i o n ,

c o m b i n e d w i t h a very weak form of

this w e a k form of the o p t i o n a l s a m p l i n g t h e o r e m

is still s u f f i c i e n t l y strong for p r o v i n g another o p t i m a l i t y result for amarts. Let

(C) be an arbitrary, but fixed p r o p e r t y of set f u n c t i o n

processes.

2.7.4.

Theorem.

Suppose that (i)

e v e r y set f u n c t i o n p r o c e s s of a m a r t i n g a l e lim ~n(~)

(ii}

~

exists,

~

having property

and a set f u n c t i o n process

~

for w h i c h

and that

for each set f u n c t i o n process each i n c r e a s i n g sequence

~

having property

{ T n E T(n)

I n 6~

s t o p p i n g times, the set f u n c t i o n process property

(C) is the sum

}

{ ~n

(C) and for

of b o u n d e d I n E~

(C).

Then every set f u n c t i o n process h a v i n g p r o p e r t y

(C) is an amart.

}

has

118

Proof.

Consider

a exists, If

process

~

having property

(C). T h e n

l i m ~n(~)

(i) and T h e o r e m

{ i n E T(n)

times, by

by

:=

a set f u n c t i o n

I n E~

}

2.3.1.

is any i n c r e a s i n g

t h e n the set f u n c t i o n

(ii), h e n c e

l i m ~r

(~)

process

sequence

{ ~I

exists,

I n 6~

of b o u n d e d }

stopping

has p r o p e r t y

(C),

n

n Now select a sequence for all

k 6~

For each

{ n k 6~

I k E~

, define

a stopping

nk m

satisfying

n k < Tnk < nk+ 1 ,

.

m£~

o

}

(~)

time

O m E T(m)

,

if

m

=

2k - I

,

if

m

=

2k

by letting

:=

T

(~)

nk Then times,

{ O m 6 T(m) hence

Therefore,

I m 6~

}

is an i n c r e a s i n g

the set f u n c t i o n lim Bo

(~)

process

exists,

sequence

{ ~Om

I m E~

of b o u n d e d }

stopping

has p r o p e r t y

(C).

a n d we h a v e

m l i m ~n(~)

=

l i m ~nk (Q)

=

l i m PO2k_l (~)

=

l i m ~ O m (~)

lim Ba2k(~)

=

lim Bo

as w e l l as

! i m ~T

(~)

=

l i m ~r

n

(~)

=

nk

(Q) m

which yields

a

=

l i m ~n(~)

=

lim ~r

(~) n

Finally,

suppose

that

s E (0,~)

such that,

T n £ T(n)

satisfying

e

<

lim

is n o t an amart.

for e a c h

n 6~

Then there exists

, there exists

a stopping

some time

la-I~T. (n) I n

S i n c e the s t o p p i n g subsequence

~

t i m e s are b o u n d e d ,

{ Tnk 6 T ( n k) la - ~T

(~) I

I k E~ =

we m a y s e l e c t an i n c r e a s i n g

} . F o r this s u b s e q u e n c e ,

0

nk B u t this c o n t r a d i c t s

the a s s u m p t i o n ,

hence

_~

is an amart.

we h a v e

'

119

This r e s u l t means, to a larger class form of e i t h e r This r e s u l t the limit;

that

it is i m p o s s i b l e

of set f u n c t i o n

see C h a p t e r

counterpart

of T h e o r e m

and S u c h e s t o n

2.7.4

of r a n d o m variables.

any r e a s o n a b l e

sampling

theorem.

to m a r t i n g a l e s

in

of these processes.

processes

the a n s w e r

to c o m p a r e

For a r b i t r a r y

or not t h e i r g e n e r a l i z e d

form an a m a r t of r a n d o m variables.

2.7.5.

loosing

respect

discussion

for s t o c h a s t i c

it seems to be s u i t a b l e

is not c l e a r w h e t h e r

however,

without

or the o p t i o n a l

interesting.with

5 for a b r i e f

the class of amarts

The

is due to E d g a r

[61].

At this point, with amarts

processes

the Riesz d e c o m p o s i t i o n

is p a r t i c u l a r l y

to e x t e n d

amarts

amarts

of m e a s u r e s

of measures,

Radon-Nikodym

For b o u n d e d

amarts

it

derivatives

of measures,

is positive:

Theorem.

The g e n e r a l i z e d

Radon-Nikodym

derivatives

of a b o u n d e d

a m a r t of m e a s u r e s

form an a m a r t of r a n d o m variables.

Proof.

F i r s t note

a potential Riesz

that the g e n e r a l i z e d

of m e a s u r e s

decomposition

form a p o t e n t i a l

for amarts,

to a b o u n d e d m a r t i n g a l e Jordan

decomposition

construction

~

[100; P r o p o s i t i o n

III-2-7] of

Radon-Nikodym

- ~

. It then

Radon-Nikodym

form a p o s i t i v e The

derivatives

, ~)

By the attention

follows

from the

derivatives

and from

Radon-Nikodym

apply

to

5-

of

. N o w the

supermartingale,

same a r g u m e n t s

form an a m a r t of r a n d o m v a r i a b l e s

to r e s t r i c t ~£ba(F

that the g e n e r a l i z e d

~+

amart of r a n d o m variables. generalized

~ = ~

of the g e n e r a l i z e d

of the r e s t r i c t i o n s

limit m e a s u r e .+

derivatives

of r a n d o m variables.

it is s u f f i c i e n t

with

yields

Radon-Nikodym

derivatives h e n c e an

. Thus,

the

of the b o u n d e d m a r t i n g a l e

(although

they need not form a

martingale),

Semiamarts

were

u

introduced

by K r e n g e l

Krengel

[87]. T h e s e a u t h o r s

bounded

semiamarts

amarts

also

introduced

with an a d d i t i o n a l

in the c l a s s of s e m i a m a r t s

enveloppe

de Snell goes b a c k

semiamarts

of m e a s u r e s ,

On the trivial and o n l y

de Snell,

stochastic

basis,

if its g e n e r a l i z e d

On an a r b i t r a r y

to G h o u s s o u b

stochastic

a

The

see also Snell

(bounded)

property

w h i c h are of

of the

[75]. F o r

first c o n s t r u c t e d [121] a n d N e v e u

semiamart

derivatives

this e q u i v a l e n c e

see also

identification

and S u c h e s t o n

de Snell was

Radon-Nikodym basis,

[88,89];

semipotentials

property.

by a p a r t i c u l a r

the e n v e l o p p e

[112]. F o r the e n v e l o p p e

and S u c h e s t o n

is an a m a r t converge

in

[100].

if

a.e.

need not be true.

120

By the f o l l o w i n g Tulcea

example,

although

their g e n e r a l i z e d

2.7.6.

process

~

for all

n 6~

and

lim D n ~ n

1

is taken

Closely

:=

I

k £ K(n)

=

0

[50]

Edgar,

and I o n e s c u

fail to be an a m a r t converge:

denote

,

otherwise

. Then

[88,89]

the class

and

~

is odd and

k = I

is a b o u n d e d

semiamart

which

we have

,

measure.

are the f o l l o w i n g

by C h o w

well

problems

processes, [41]

and Schmidt

which were

by D u b i n s

and

for s u b m a r t i n g a l e s ,

[110]

for semiamarts.

suited to the m e a s u r e of set f u n c t i o n

of all s t o p p i n g

a set f u n c t i o n A 6 F

and by These

theoretic

approach.

processes,

we h a v e

times

process

~

for the s t o c h a s t i c

. For an a r b i t r a r y

basis

stopping

, the series

~p(AN{a=p})

n e e d not converge.

Thus,

in the u s u a l way. it can be p r o v e n

Therefore,

0

, d e f i n e a set f u n c t i o n

the notation:

Z p=1

then

n

t h e m in the f r a m e w o r k

, and c o n s i d e r

~o

if

of s t o c h a s t i c

are p a r t i c u l a r l y

stating

~ £ S

,

for m a r t i n g a l e s ,

and S u c h e s t o n

to e x p l a i n

I

to s e m i a m a r t s

in the f r a m e w o r k

problems

[0,1)

to be the L e b e s g u e

related

Krengel

on

a.e.

studied,

time

which

derivatives

basis

Moreover,

Freedman

S

Radon-Nikodym

stochastic

fails to be an amart.

Let

semiamarts

by letting

~n"(Bn,k)

Before

is due to Austin,

Example.

On the s t a n d a r d

if

which

[3], there e x i s t b o u n d e d

we define,

I~I(A)

it m a y be i m p o s s i b l e

If the a b o v e

series

that the i d e n t i t y for all

:=

N o w the a b o v e m e n t i o n e d

Z p=l

~6 S

and

to d e f i n e

converges

of Lemma A£ F

a set f u n c t i o n

for all

2.2.1

A E F

,

obtains.

,

I~pI(AN{~=p}]

problems

can be stated

in the f o l l o w i n g

way:

121

When

-

-

is the v a l u e

SUPs

I~oI(~)

finite?

When

is the value

sup s

I~I(~)

attained

time

in

for some

stopping

S ?

It can be shown that the first p r o b l e m

reduces

to b o u n d e d

stopping

times,

due to the i d e n t i t y

sup S

I~oI (~)

It then follows only

if

~

out that

suPT

from T h e o r e m

is a b o u n d e d SUPs

is either process

=

I~oI(~)

be attained.

fails

these

it reveals

that

T-boundedness theory.

By T h e o r e m

-

-

Example

n £~

the sets

stopping

on

of a m a r t

times.

This

In our opinion,

boundedness

property

is

in a m a r t

the v e c t o r

by the p o s i t i v e

lattice

of all T - b o u n d e d

of all

set f u n c t i o n

set f u n c t i o n

lattice but

processes.

of all b o u n d e d

amarts

it need not be c o m p l e t e

since these n o r m s may

inequality

(Lemma

set f u n c t i o n

in the m a x i m a l

be r e p l a c e d

2.7.7.

some c o m m e n t s merits

fail to be equivalent,

for by

2.4.9.

T-bounded

For

important

the ideal g e n e r a t e d

for the T-norm,

The m a x i m a l

that

if

set f u n c t i o n

properties.

in the v e c t o r

2.5.3,

is c o m p l e t e

-

important

consists

the ~ - n o r m

S

this c l a i m by some examples: 2.6.4,

By T h e o r e m

it turns

in

the s u p r e m u m m a y not

on real amarts by g i v i n g

to b o u n d e d n e s s

supermartingales processes

time

if and

[114].

one of the m o s t

is the really

is finite

or an ~ - b o u n d e d

otherwise,

the role of the b o u n d e d

respect

We i l l u s t r a t e

I~oI(~)

stopping

is not ~ - b o u n d e d

remarks

theory

true w i t h

for some

see Schmidt

It is c e r t a i n l y

SUPs

As to the second problem,

to be a semiamart;

the T-norm.

also

that

semiamart.

For details,

Let us c o m p l e t e

2.2.4

is a t t a i n e d

a semiamart which

which

[~TI (~)

2.5.12)

processes.

inequality

makes

sense only

The f o l l o w i n g

the T - n o r m

cannot

example

for shows

in general

by the ~ - n o r m :

Example. and Bn, p

k £ K(n) ,

p 6K(n)

, let

F2n+k_2

, and define

denote

the algebra

a measure

by letting

~ 2 n + k _ 2 (B n , p )

2 -n

t

if

k = p

0

,

otherwise

:=

~2n+k_2

generated on

by

F2n+k_2

122

Then the set f u n c t i o n p r o c e s s

su~

]~n[(n)

=

2-I

sup T

l~xl(S)

=

1

_~

is a b o u n d e d

semiamart,

and we have

and

Moreover,

if

l

is taken to be the L e b e s g u e measure,

(J X) ( { s u ~ I D n ~ n l > E}) for all

e £ (0,1)

sup~ for all

=

then we have

I

, hence

l~nl(n)

<

e ( J l ) ( { s u ~ I D n ~ n l > e})

<

suPT

l~xl(~)

e £ (2-1,1)

Due to T h e o r e m 2.2.4, T-boundedness

the d i s t i n c t i o n b e t w e e n ~ - b o u n d e d n e s s

and

is s o m e w h a t o b s c u r e d in the real case, but it w i l l turn

out to be substantial and i n d i s p e n s a b l e in the v e c t o r - v a l u e d case.

3.

Amar

t s

To a large extent,

in

the p r o p e r t i e s

space can be a t t r i b u t e d turn,

depend

differ

a

on the s t r u c t u r e

Lebesgue

measure,

which

Radon-Nikodym

be T-bounded, an infinite

this

Radon-Nikodym

unless

and even a T - b o u n d e d

dimensional

Banach

amarts

and the v a r i a t i o n

to the e x i s t e n c e

space has the

Banach

strong a m a r t

space may fail to

the R a d o n - N i k o d y m

connected the

with

These

the fact that,

semivariation

n o r m are not equivalent,

in

property

st r o n g l y b u t only weakly.

variation,

By the

amart of r a n d o m v a r i a b l e s

space h a v i n g

are c l o s e l y

of b o u n d e d

if and only

part of the limit

an ~ - b o u n d e d

dimensional strong

in

an ~ - b o u n d e d

derivative.

reduces

the B a n a c h

example,

dual n e e d not c o n v e r g e

of strong

For example,

space c o n v e r g e s

of the A - c o n t i n u o u s

As a n o t h e r

which,

space and m a y c o n s i d e r a b l y

latter c o n d i t i o n

in an infinite

for v e c t o r m e a s u r e s sup-norm)

in a Banach

in a B a n a c h

is not g u a r a n t e e d property.

and a s e p a r a b l e properties

processes

of v e c t o r m e a s u r e s

of real measures.

derivative

of r a n d o m v a r i a b l e s

of stochastic

has a g e n e r a l i z e d

decomposition,

of a R a d o n - N i k o d y m

.

of the B a n a c h

of r a n d o m v a r i a b l e s

if its limit m e a s u r e

space

to the p r o p e r t i e s

from the p r o p e r t i e s

martingale

B a n a c h

unless

norm

(or

the B a n a c h

space has finite dimension.

The a b o v e - m e n t i o n e d dimensional

Banach

deficiencies

u n i f o r m weak amarts: property whereas

Uniform

amarts

and form an e n t i r e l y u n i f o r m w e a k amarts

the weak c o n v e r g e n c e Banach

space

of strong a m a r t s

space lead to the n o t i o n s are

theorem remains

is thus much

strong

satisfactory

generalize

richer

than

in an i n f i n i t e

of u n i f o r m amarts and amarts with an a d d i t i o n a l

counterpart

strong amarts

valid.

to real amarts,

in such a way that

The t h e o r y of a m a r t s

the theory of real amarts.

in a

124

We shall start w i t h a rather d e t a i l e d d i s c u s s i o n of vector m e a s u r e s and their r e p r e s e n t i n g linear o p e r a t o r s

(Section 3.1). A f t e r giving some

basic results on v e c t o r - v a l u e d set f u n c t i o n p r o c e s s e s we shall study m a r t i n g a l e s u n i f o r m amarts

this c h a p t e r with some remarks

T h r o u g h o u t this chapter,

its dual.

If

U(~) ~

(Section 3.4),

(Section 3.5), as well as w e a k amarts, u n i f o r m weak

amarts, and weak sequential amarts

II. II , let

(Section 3.2),

(Section 3.3), strong a m a r t s

let

~

(Section 3.6)~ We shall c o n c l u d e

(Section 3.7).

be a

(real) Banach space with n o r m

denote its closed unit ball, and let and

~

are Banach spaces,

all b o u n d e d linear o p e r a t o r s

~

> ~

~'

denote

then the B a n a c h space of

will be d e n o t e d by* ~ ( ~ , ~)

3.1.

V e c t o r

This

section

consists

bounded

vector

on the

sup-norm

These

results

out

result

shed

to b e u s e f u l

lattice.

In t h e

for vector

in t h e

For detailed

Let

be an algebra

and uniform

investigation

variation derivative

space with

of all

measures

amarts.

measures,

bounded on t h e

also turn

in a B a n a c h

and used

of a v e c t o r

variation.

and also

They will

measures

is g i v e n

functions.

between

the Lebesgue

the Radon-Nikodym

on v e c t o r

simple

existing

that

operators

of b o u n d e d

variation,

of vector

section,

i t is s h o w n linear

decomposition to construct

measure

of b o u n d e d

property.

we refer

to t h e b o o k b y

[49].

A set function

~

~(A+B)

holds

lattice

of b o u n d e d

part of this

information

and Uhl

F

amarts

Radon-Nikodym

Diestel

first part, by bounded

for vector

measures

of bounded

in a B a n a c h

In t h e

light on the difference

strong

measures

the generalized variation

some

second

.

of the vector

is p r o v e n

and vector

between

e s

may be represented

completion

measures

difference

a s ur

of two parts.

measures

A corresponding

vector

me

on a set

: F

=

> ~

~(A)

~

.

is a d d i t i v e

if t h e

identity

+ B(B)

f o r e a c h p a i r of d i s j o i n t

sets

A, B 6 F , a n d

it is b o u n d e d

if t h e

value

sup F

is f i n i t e . measures. and

lJ ~(A)

In t h e Let

b a ( F , ]E)

a(F, ~ )

. Endowed

scalars,

these

i

is a n o r m although

on

sequel,

a(F, ~ )

let

by

with

sup F

ba(F, ~)

measure

set functions

the class

the class

are vector

Jl ~(A)

be called

of all vector

measures

vector

vector F

measures

> ~ in

defined

addition

and multiplication

spaces.

Clearly,

the map

H

, but we

norm

will

of all b o u n d e d

the pointwise

classes

>

additive

denote

denote

equivalent

For a vector

11

on this

~ 6 a(F, ~ )

shall

see that there

space.

, define

a map

is a m o r e

natural

,

126

III ~ III

:

,.I-

by l e t t i n g

III ~ Ill(A)

for all

:=

A E F , where

sup

II Z ~i~(Ai)

II

,

the s u p r e m u m

is t a k e n o v e r all p a r t i t i o n s

and scalars

~I' ~2 . . . . .

{ A I , A 2 ..... ~ }

E P(A)

Then

is a s u b a d d i t i v e

set f u n c t i o n w h i c h w i l l be c a l l e d

of

~ . F o r all

A E F , we h a v e

li ~(B) II

III ~ III(A)

III ~ III

semivariation

supF(A) [49; P r o p o s i t i o n

I.I.11].

<_

Consequently,

a n d o n l y if its s e m i v a r i a t i o n

<

~

sup F II ~(A) II

I

>

III ~ III(S)

[-1,1] the

2 s u P F ( A ) II ~(B) II

a vector measure

is b o u n d e d ,

~

eke

is b o u n d e d

if

a n d the m a p s

and

are equivalent

n o r m s on

the s e m i v a r i a t i o n vector measures

ba(F, ~ )

. The above-mentioned

preference

n o r m w i l l be j u s t i f i e d b y the r e p r e s e n t a t i o n

by bounded

linear operators

for

of b o u n d e d

w h i c h w e a r e g o i n g to d i s c u s s

now.

For a vector measure

~ E a(F, ~ )

T O : ]DO

, define a linear operator

> ]E

by letting

To(Z~i~A

1

)

:=

for e a c h s i m p l e f u n c t i o n operator

]Do

(A) for all

> ~

=

Z ~i~(Ai) Z ~iXAi

£ ]Do " T h e n

T

o

satisfying

ToX A

A q F . Furthermore,

SUPu (]Do)

,

we have

TO( X ~iXA'I )

=

III ~ III(Q)

,

is the u n i q u e

linear

127

w h i c h means case,

To

is b o u n d e d if and only if B is bounded. o has a u n i q u e e x t e n s i o n to a b o u n d e d linear o p e r a t o r that

the s u p - n o r m c o m p l e t i o n representin~

denote

X

T0X

Do

" This e x t e n s i o n

of the b o u n d e d in

on

~

the

, and it

satisfying

,

vector measure

X

> ~ ( m , ~)

:

T

will be c a l l e d

vector measure

~ ( D , ~)

is the u n i v e r s a l

ba(F, ~)

the map a s s o c i a t i n g

its r e p r e s e n t i n g

3.1.1.

of

linear operator

=

where

D

linear o p e r a t o r

is the u n i q u e

In this

T

on

w i t h each b o u n d e d

linear operator.

F . Let

vector measure

F

>

T h e n we have:

Theorem.

The class the map

ba(F, ~) X

Proof.

is an isometric

The m a p

E b a ( F , ~) III U I]1 ( f i )

is a B a n a c h

and

=

X

for the n o r m

isomorphism

is c l e a r l y

T£~(

space

D , ~)

of

III. lll(fi) , and

ba(F, ~)

onto

linear and b i j e c t i v e .

satisfying

~ = T 0X

~ ( D , ~)

Moreover,

for

, we have D

I] T I[

L e t us n e x t c o n s i d e r

vector measures

For a v e c t o r m e a s u r e

II~II

"

6 a(F, ~)

of b o u n d e d v a r i a t i o n .

, define

a map

> ~+

F

by letting

II ~ II ( A ) for all called

: =

A6 F . Then the v a r i a t i o n

variation

is bounded,

finite dimension; vector measures

sup?(A ) Z II ~ II

of

is an a d d i t i v e . Clearly,

Let

In or d e r to c h a r a c t e r i z e

set f u n c t i o n

in

vector measures

linear operators,

w h i c h w i l l be of b o u n d e d

n e e d not be true unless

bva(F, ~)

of b o u n d e d v a r i a t i o n

,

each vector measure

b u t the c o n v e r s e

see below.

of their r e p r e s e n t i n g defin i t i o n :

~

II ~ ( A i) II

denote

~

has

the class of all

a~F, ~)

of b o u n d e d v a r i a t i o n let us recall

in terms

the f o l l o w i n g

128

If

~

linear

is a B a n a c h

lattice

operator

........>......~..

~

and

~

is a B a n a c h

is c o n e

absolutely

summable

sequences

in the p o s i t i v e

summable

sequences

in

absolutely such

summing

cone

. A linear

if a n d o n l y

of

~

into

operator

if t h e r e

then a bounded if it m a p s

the a b s o l u t e l y

S 6 ~ ( ~ , ~)

exists

the

is c o n e

a constant

p 6~+

that

Z holds

II Sx i II

for e a c h

absolutely smallest

where

constant

the

is a n o r m

collection

=

is t a k e n

~

[109;

over

c~+

, let

. For a cone

II S II1

inequality.

denote

the

T h e n we h a v e

,

all

finite

collections

II Z x i Hi = I . M o r e o v e r ,

the m a p

II S II1

> ~

Section

3.1.2.

> ~

the a b o v e

satisfying

>

If' (x i) I

{Xl,X2,...,Xk} :~

II S x i II

sup Z

on the c l a s s

operators

S

satisfying

c~+

I

P SUPu ( IF ' ) Z

operator

supremum

{Xl,X2,...,Xk}

S

_<

finite

summing

II S II1

see

~

space,

summing

~ i ( ~ , ~)

, which

of all

is a B a n a c h

cone

space

absolutely

for

this

summing

norm.

For details,

IV.3].

Theorem.

The c l a s s the m a p

bva(P, 2) X

Proof.

In o r d e r

a vector

is a B a n a c h

is a n i s o m e t r i c

measure

to p r o v e

space

isomorphism

the t h e o r e m ,

~ 6 ba (P, ~.)

and

for

the n o r m

of

bva(F, 2)

II . II (Q) onto

it is s u f f i c i e n t

its r e p r e s e n t i n g

, and

11.1( • , ]E)

to c o n s i d e r

linear

operator

T 6"IT.( ]19, ~.) Suppose

first

collection

that

~

has bounded

{x I ,x2,... ,x k}

II X x i II = I . C h o o s e ~ij 6JR+

such

variation.

of p o s i t i v e

a partition

Consider

simple

{B I , B 2 , . . . , B m} £ F(~)

that m

xi holds

for all k X i=1

=

X j=1

~ijXB.3

i £ {I,2, .... ,k}

ti Tx i il

=

k Z i=I

. Then we have m

li Z j=1

~ij~(Bj)

II

a finite

functions

satisfying and

scalars

129 m

k

z j=1

x i=I

~ij

<

sup j

k x i=I

~ ~ij

=

II ~ x i II II ~ ll(n)

=

II ~ II (n)

<

hence

T

is c o n e

absolutely

II T II1

<

Conversely,

if

partition

T

II ~(B.) 3

II

II ~ ll(n)

,

summing

a n d we h a v e

II ~ll(s) is c o n e

{ A I , A 2 ..... % }

5- II ~(A i) II

absolutely 6 P(~)

=

z

summing,

t h e n w e have,

for e a c h

II ~ XA. II

II T II1

,

II TXA.

II

<

II T II1

l

hence

~

has bounded

II B II (~) From

this

the

variation

<

In o r d e r

to g i v e

of b o u n d e d

and we have

li T [iI

assertion

measures

=

l

follows.

a variant

of the p r e c e d i n g

variation,

let us a l s o

characterization recall

the

of v e c t o r

following

definition:

If

~

and

~

are Banach

is a b s o l u t e l y

summin~

absolutely

summable

absolutely

summing

spaces,

if it m a p s

sequences if a n d o n l y

in

then a bounded the

summable

sequences

I{ . A l i n e a r

if t h e r e

linear

operator in

operator

exists

a constant

~

~

>

into

the

S 6~( ~, ~) p£]R+

is

such

that

I holds

Jl Sx iil

for e a c h

summing constant

<

finite

operator

S

satisfying

P SUPu(IF') collection

:~

> ~

the a b o v e

Z

If' (x i)

{xl,x2,...,XkJ

, let

it S il

inequality.

as Then

c~

denote

. F o r an a b s o l u t e l y the

the m a p

smallest

130

S

I

•

II S llas

is a n o r m on the class operators see

~

[83] and

3.1.3.

~ a s ( ~ , ~)

of all a b s o l u t e l y summing

, w h i c h is a B a n a c h space for this norm. For details,

[104].

Corollary.

The map

X

Proof. and

> ~

is an isometric i s o m o r p h i s m of

Since

D

~ a s ( 9 , ~)

is an AM-space,

are identical;

see

bva(F, ~)

the B a n a c h spaces

onto

~ a s ( 9 , ~)

~ i ( D , ~)

[109; Section IV.5].

A p a r t i c u l a r situation arises in the case w h e r e

~

has finite dimension.

Let us first c h a r a c t e r i z e a b s o l u t e l y summing o p e r a t o r s in terms of v e c t o r measures.

This c h a r a c t e r i z a t i o n will then lead to a c h a r a c t e r i z a t i o n of

finite d i m e n s i o n a l Banach spaces.

3.1.4.

Theorem.

Suppose

~

and

~

linear operator.

are B a n a c h spaces and

S :~

•

is a b o u n d e d

Then the f o l l o w i n g are equivalent:

(a)

S

(b)

There exists a c o n s t a n t

is a b s o l u t e l y summing. p E]R+

such that

II S~ IJ(Q) < p III ~ III(~) holds for each algebra each v e c t o r m e a s u r e (c)

S~ £ bva(F, ~) measure

Moreover, with

if

S

~£ba(F,

and for

~)

holds for each algebra

~£ba(F,

F

F

and for each v e c t o r

~)

is a b s o l u t e l y summing,

then the i n e q u a l i t y in

(b) holds

p = II S llas

Proof.

Suppose first that

vector measure T 6 ~ ( D , ~)

~6ba(F,

. Then

~)

S 0 T

S

is a b s o l u t e l y summing. C o n s i d e r a

w i t h r e p r e s e n t i n g linear o p e r a t o r

is a b s o l u t e l y summing, and it is the

r e p r e s e n t i n g linear o p e r a t o r of the v e c t o r m e a s u r e b o u n d e d varia{ion,

Therefore,

=

II S 0 T llas

<

II S llas II T II

(a) implies

(b) implies

3.1.5 that

S~

by C o r o l l a r y 3.1.3, and we have

II S~ II (n)

Clearly,

S~ . Hence

=

II S llas

III l~ III (n)

(b).

(c), and it follows f r o m the s u b s e q u e n t Example

(c) implies

(a).

has

131

3.1.5.

Example:

Suppose

~

and

~

are Banach

linear operator which

Then there exists a summable sequence Consider Bn, 2 :=

{ Sx n

I n E~

}

the a l g e b r a [2-n,2 -n+1)

spaces and

is n o t a b s o l u t e l y

{ xn E~

is n o t a b s o l u t e l y

F ,

sequence

S :~

on

[0,1)

n 6~

--~

is a b o u n d e d

summing.

which

, and define

I n 6~

}

such t h a t the

summable.

is g e n e r a t e d

b y the sets

a vector measure

~ 6 a(F, ~)

by l e t t i n g

~(Bn, 2) for all

n 6~

:=

. T h e n the v e c t o r m e a s u r e

{ ZH x n is b o u n d e d

3.1.6.

I H c~

[83; T h e o r e m

have bounded

,

xn

finite 14.6.1],

~

b u t the v e c t o r m e a s u r e

S~

does not

are equivalent: has finite dimension.

[[I B [il(~) = il ~ li(n)

(b)

vector measure (c)

bva(F, ~)

Proof.

By the t h e o r e m

the B a n a c h

space

~

=

H i~

N o w the a s s e r t i o n

holds

for each algebra

F

a n d for e a c h

for e a c h a l g e b r a

F .

~ 6 ba(F, ~)

= ba(F, ~ )

holds

of D v o r e t z k y - R o g e r s

has finite dimension

is a b s o l u t e l y

I

Recall

}

Corollar[~

(a)

i~

s i n c e the f a m i l y

variation.

The following

map

is b o u n d e d

summing,

iS =

follows

19.6.9],

a n d in t h i s c a s e w e h a v e

il i ~

llas

from Theorem

t h a t the s e m i v a r i a t i o n

[83; T h e o r e m

if a n d o n l y if the i d e n t i t y

3.1.4.

of a v e c t o r m e a s u r e

~ E ba(F, ~ )

satisfies

the i d e n t i t y

HI ~ iiI (A) for all

A£ F

vector measures

=

SUPu(]E')

[49; P r o p o s i t i o n of b o u n d e d

ie' 0 I/I (A)

I.I.11].

variation

,

A related

characterization

is the f o l l o w i n g :

of

132

3.1.7.

Lemma.

For a vector measure

~ 6 ba(F, ~ )

(a)

~

(b)

The f a m i l y

, the f o l l o w i n g

are equivalent:

has bounded variation. { le' 0 ~]

I e' 6 U ( ~ ' )

}

has a s u p r e m u m

in

ba(F, ~ ) Moreover,

if

~

Proof.

If

B

all

e' £ U ( ~ ' )

AL-space

variation,

then

has bounded

variation,

then

, hence

SUPu ( ~ , )

le' o ~i

H ~ i~ = S U P u ( ~ , )

]e' o ~] < exists

H ~ II

since

le' o ~i

holds

for

ba(F, ~)

as an

is o r d e r c o m p l e t e .

Conversely, Fix

has b o u n d e d

suppose

e £ (0,~)

e~, e½ . . . . .

that

. For

~

AE F

e~ 6 U ( ~ ' )

Z

H ~ ( A i) H

:= S U P u ( ~ , a n d for

) Ie' 0 ~]

exists

{ A I , A 2 , . . . , A k} 6 P(A)

in

b a ( F , JR)

, choose

satisfying

<

Z

Hi B if] (A i)

<

Z

le! 0 ~ l ( A i) + e

<

~ (A) + C

--

1

This yields

H B H (A)

for a l l

If

~

<

Q0(A)

,

A £ F .

is a m e a s u r e

in

ba(F, JR) , t h e n a v e c t o r m e a s u r e

w i l l be s a i d to be ~ - c o n t i n u o u s ~-continuous,

if its v a r i a t i o n

~6bva(F,

II ~ II 6 b a ( F ,

a n d it w i l l be said to be ~ - s i n g u l a r

~)

~) is

if i t s v a r i a t i o n

is ~ - s i n g u l a r . 3.1.8.

Lemma.

For a measure following

~6ba(F,

(a)

~

(b)

e' o ~

Proof.

If

II ~II

and a vector measure

is ~ - c o n t i n u o u s

~£bva(F,

~)

, the

JR)

band

= SUPu(~,)

~-continuous.

(resp. ~ - s i n g u l a r ) .

is ~ - c o n t i n u o u s

e' o B

Je' o ~i 6 b a ~ ( F , projection

~)

are equivalent:

in

(resp. ~ - s i n g u l a r )

is q0-continuous f o r e a c h

e' £ U ( ~ E ' )

, for all

e' EU(IR.,)

. Since

ba(F, JR)

, by T h e o r e m

2.1.4,

]e' o ~] 6baq°(F, JR) , by L e m m a

The c o n v e r s e

is o b v i o u s .

for e a c h

e' 6 U ( ~ ' )

, then we have

baQ°(F, JR)

is a

we h a v e 3.1.7,

hence

~

is D

133

The next result is the L e b e s ~ u e d e c o m p o s i t i o n for v e c t o r m e a s u r e s of b o u n d e d variation:

3.1.9.

Theorem.

For each m e a s u r e

~ 6 b a ( F , ~)

and for each vector m e a s u r e

there exists a ~ - c o n t i n u o u s v e c t o r m e a s u r e ~-singular vector measure

~s

£ b v a ( F , ~)

~£bva(F,

~@c E bva(F, ~) satisfying

~)

and a

~ = ~c

+ ~s

The d e c o m p o s i t i o n is unique. Moreover, ~I ~ I~

H ~ ~I = II ~ c

with r e s p e c t to

H + II ~ s

H

is the L e b e s g u e d e c o m p o s i t i o n of

~ .

The proof of the L e b e s g u e d e c o m p o s i t i o n for v e c t o r m e a s u r e s of b o u n d e d v a r i a t i o n p r o c e e d s via a Stone space argument;

see

[49; T h e o r e m 1.5.9]

and use Lemma 3.1.8.

For

~ 6 ba(F, ~)

vector measures

, let in

C@ :

bva@(F, ~)

bva(F, ~)

bva(F, ~)

denote the class of all ~ - c o n t i n u o u s

, and let

> bva~(F, ~)

denote the p r o j e c t i o n given by T h e o r e m 3.1.9.

3.1.10.

Corollary.

For each m e a s u r e

~6ba(F,

~)

is a c o n t r a c t i v e projection, and

(i~-

C~) (bva(F, ~))

c o m p l e m e n t e d subspaces of

A vector m e a s u r e

~ : F

Z B(A n) n=1

=

, the map

C ~ : bva(F, ~)

and the classes

£ F . Let

are B a n a c h spaces for the n o r m

> ~

for the n o r m

II. li(~)

and

is c o u n t a b l y a d d i t i v e if the identity

~( Z A n) n=1

bvca(F, ~)

n v e c t o r m e a s u r e s in

= C@(bva(F, ~))

bva(F, ~)

holds for each sequence of m u t u a l l y d i s j o i n t sets Z A

> bva~(F, ~)

bva@(F, ~)

An 6 F

satisfying

denote the class of all c o u n t a b l y a d d i t i v e

bva(F, ~)

. The class

bvca(F, ~)

Jl. ll(~) , and a v e c t o r m e a s u r e in

is a B a n a c h space

bva(F, ~)

is c o u n t a b l y

a d d i t i v e if and only if its v a r i a t i o n is c o u n t a b l y additive. Let denote the ~ - a l g e b r a g e n e r a t e d by bvca(F, ~)

F . Then each v e c t o r m e a s u r e in

has a unique e x t e n s i o n to a v e c t o r m e a s u r e in

and the map

J :

bvca(F, 7R)

> bvca([, TR.)

,

bvca(;, ~)

,

134

w h i c h a s s o c i a t e s with each v e c t o r m e a s u r e in to a v e c t o r m e a s u r e in bvca(F, ~)

onto

onto

J

to

bva ~(F, ]E)

bvaJ~(T, ~)

its e x t e n s i o n

for a m e a s u r e

~£bca(F,

JR) ,

is an isometric i s o m o r p h i s m of

For details,

For the r e m a i n d e r of this section,

bvca(F, ]E)

, is an isometric i s o m o r p h i s m of

bvca(~, 7R.) . Moreover,

the r e s t r i c t i o n of bva~(F, ~)

bvca(~, ~)

see

suppose that

[49; C h a p t e r I].

]E

has the R a d o n - N i k o d y m

p r o p e r t y and that

A :

F

:~

[0,1]

is a fixed p r o b a b i l i t y measure. RA :

bvaJA(T, I~.)

By the R a d o n - N i k o d y m property, > L 1 (F,JA, ]E)

,

w h i c h a s s o c i a t e s with each J A - c o n t i n u o u s v e c t o r m e a s u r e in its R a d o n - N i k o d y m d e r i v a t i v e w i t h r e s p e c t to isomorphism.

the map

JA

bva(~, IR)

, is an i s o m e t r i c

It then follows that the map

RA O J :

bvaA(F, ~E)

> L I(~,JA, ]E)

also is an isometric isomorphism. The map P ~ d o n - N i k o d y m o p e r a t o r w i t h respect to CA :

bva(F, ~)

RA 0 J

will be c a l l e d the

A . Let

> bvaA(F, ~R)

d e n o t e the c o n t r a c t i v e p r o j e c t i o n given by T h e o r e m 3.1.9 and define DA

:=

RA o J o CA

The map DA :

bva(F, ~)

> LI(~,JA, ~)

will be c a l l e d the @ e n e r a l i z e d R a d o n - N i k o d y m o p e r a t o r with r e s p e c t to

i . For

~6bva(F,

~)

, the r a n d o m v a r i a b l e

DAb£LI(~,JA,

be c a l l e d the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e of to

B

~)

will

with respect

A .

The f o l l o w i n g e l e m e n t a r y result w i l l be u s e f u l in p r o v i n g w e a k c o n v e r g e n c e theorems for the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s of a set f u n c t i o n process:

3.1.11. Suppose

Theorem. ~

has the Radon-Nikodym property.

Then e' (DAb) holds for all Proof.

=

DA(e'~)

~ £ bva(F, ~)

and

e' 6~'

The Lebesgue decomposition of e'~

=

e'~ Ac + e'~ As

By Lemma 3.1.8,

=

yields

,

and the Lebesgue decomposition of e'~

~

e'~

is given by

(e'~) Ac . (e'~) As

e'~ Ac

is A-continuous and

e'~ As

By Theorem 2.1.4, the Lebesgue decomposition of

is A-singular.

e'~

is unique.

Therefore, we have e,~ lc

=

(e,~) xc

hence e,(j~ lc)

=

Jle,~ lc)

=

j((e,~) Ac)

This yields [ e'(DA~) d(JA) JA for all

=

e' I DAb d(Jl) A

=

A 6 F , from which the assertion follows.

;

DA(e'~) d(JA) A

,

3.2.

Set

Let

F

f u n c t i o n

be a s t o c h a s t i c

p r o c e s s e s

b a s i s on a set

~ .

A sequence

:=

{ ~n6bva(Fn

, ~)

w i l l be c a l l e d a v e c t o r - v a l u e d

Consider For

Then

~r

~

and a bounded

on

[

stopping

.

time

T .

:=

Z Up(A{T=p}) p=1

is a v e c t o r m e a s u r e

in

b v a ( F r , ~)

a n d we h a v e the f o l l o w i n g

lemma:

Lemma.

3.2.1.

If

~

process

, define

uT(A)

elementary

}

set f u n c t i o n

a set f u n c t i o n p r o c e s s

AE F

I n6m

is a set f u n c t i o n

process

and

•

is a b o u n d e d

stopping

time,

then the i d e n t i t y ao

II u T II (A) holds

for all

Proof.

For

A £ F

p £~

11 U~ If(B)

For

=

Z p=l

II Up II (AN{T=p})

T

and

B C FT({r=p})

, we h a v e

FT(B)

= Pp(B)

k i=IZ II u T ( B i) II

=

s u p p T(B)

=

k s U p P p (B) i=IZ II ~ p ( B i) II

=

II ~p II (B)

A E F T , we d e d u c e

II u T II (A)

=

Z p=l

[[ ~

[I(AN{~=P})

=

Z p=l

l[ U p [I(AN{T=p})

as was to be shown.

For

, hence

MET

,

~CT(x)

U {~}

,

u£a(Fr,

~.)

and

AC F

, define

,

137

(Rx~~ ) (A)

::

~(A)

T

Then

R~_

is a v e c t o r

restriction

of

R M~ which to

~

:

, will

a(F

the

> a(F

we w i l l

be

which

will

be c a l l e d

the

map

, ~)

each vector the

, ~)

linear

measure

restriction

interested

in

map

in the

a(F

, ~)

from

its r e s t r i c t i o n

a(FT, ~ )

restriction

of

to

a(F

RT M

to

, ~)

Lemma.

x 6 T

and

is a l i n e a r

Proof.

r £ T(x) U {~}

:

R~

In p a r t i c u l a r ,

(A)

map

, ~)

(A) E

II

~ ( A i)

11

<

SUpp

(A) E

]]

~ ( A i)

II

yields

II R U T II(~) !

omit

~

is

it is T - b o u n d e d

and

the u p p e r

~-bounded

sup T

is n o r m b o u n d e d .

I TCT

=

for all

II 1.L [I

A £

F

,

(A)

II ~ II(~)

index

of

o

R~

if the v a l u e

if the v a l u e

II ~T II (Q)

it is a s e m i a m a r t

{ ~(0)

. T h e n we have,

SUpp

process

:=

, ~)

=

usually

II ~ H T is finite;

> bva(F

~6bva(F

this

shall

A set f u n c t i o n

is finite;

restriction

contraction.

Consider

we

, the

b v a ( F T , ~)

[I R~P, II

Again,

in

, and

~)

3.2.2. For

with

be c a l l e d

In m o s t c a s e s , bva(F,

F

a ( F T, ~ )

associates

F

measure

to

if the n e t

}

In c o n t r a s t

to w h a t

is k n o w n

to b e t r u e

in t h e real

138 case

(Theorem

2.2.4),

we shall

infinite

dimensional

Instead,

we have the f o l l o w i n g

3.2.3.

semiamart

space need not be T - b o u n d e d

in an

(Theorem

3.2.4).

result:

Lemma.

For a set f u n c t i o n

process

(a)

~

(b)

The value

Proof. su~

Banach

see that an T - b o u n d e d

is a s e m i a m a r t

Suppose I]~ ~n ~il(~)

m £~(M)

~

and the value

Ill ~

sup T

li~(~)

first that is finite.

and define

(~)

, the f o l l o w i n g

~

are equivalent:

ili ~n iH(~)

su~

is a s e m i a m a r t

Consider

a stopping

is finite.

is finite.

K £ T

time

~ £ T

i

M(~)

,

if

~ 6A

I

m

,

if

~ £ ~A

such that the v a l u e

and

A 6 F

. Choose

by letting

:=

Then we have

II bE(A)

II <

II ~v(s) II + II ~m(~A)

< F r o m this

it follows

The c o n v e r s e

The main

II ~T(~)

that the v a l u e

of this

~

and

~

linear operator.

section

is finite.

is the following:

are B a n a c h

Then

spaces

the f o l l o w i n g

(a)

S

is a b s o l u t e l y

(b)

S

m a p s the ~ - b o u n d e d

stochastic in

~

Suppose

first

Lemma

hence

is a T - b o u n d e d

The c o n v e r s e

S

:~

> ~

is a b o u n d e d

are equivalent:

summing.

basis)

semiamart

3.2.3,

and

semiamarts

in

~

into the T - b o u n d e d

(on an a r b i t r a r y

set f u n c t i o n

processes

.

an ~ - b o u n d e d

S~

Ill ~T lll(~)

sup T

Theorem.

Suppose

Proof.

lli ~n lli(n)

II + s u ~

is obvious.

result

3.2.4.

sup T

II

suPT

that ~

S

in

~

is a b s o l u t e l y . Then

~I S~ T If(Q)

set f u n c t i o n

summing.

sup T

is finite,

process

in

can be seen from the s u b s e q u e n t

~

Consider

H~ ~T Hi(~)

is finite,

by T h e o r e m

3.1.4,

by

hence

. Example

3.2.5.

m

139

3.2.5.

Example.

Suppose

~

and

linear operator

~

Then there exists sequence

{ Sx n

a constant HC~

are B a n a c h

which

[83; T h e o r e m

process

~

S :~

> ~

sequence { x £~ I n 6~ n is n o t a b s o l u t e l y s u m m a b l e ,

}

such that 14.6.1].

stochastic

lJ Z H x n II ~ P Let

is a b o u n d e d

summing.

a summable

I n £~

p 6~+

On the s t a n d a r d

spaces and

is n o t a b s o l u t e l y

holds

}

such t h a t the

and t h e r e e x i s t s

for e a c h f i n i t e

set

x := X x

basis

n [0,1)

on

, d e f i n e a set f u n c t i o n

by l e t t i n g n

X-

:=

Bn(Bn,k )

X

Z Xj j=1

n

0

First,

for all

n 6~

,

if

k

=

I

•

if

k

=

2

,

otherwise

, we h a v e n

=

II ~n II ( n )

II x-

:E j=l

II x II

<

+

x,

II x II

the set f u n c t i o n

consider

n 6~

,

~p(AN{T=p}) Define For all

m

ZK(p)

p£ {n,n+1,...,m-1}

II x n II

~

and

is ~ - b o u n d e d . A £ F

. For all

p 6~(n)

, we h a v e

~p(An{T=p}NBp,k)

p = m

, we t h e n h a v e

0 6 ~{~=p}

, which yields

= @ ' which yields

~p(AN{T=p}) , we have

~m(AN{T=m}) F o r all

=

+

2p

process

T £ T(n)

II 3

:= T(0)

{~=p}DBp•I

For

+

II x n II

x.

j=l

<

Therefore,

+

n T

II

--

Next•

It 3

pE~(m+1)

=

~ p ( A N { T = p } N B p , 2)

Bm, I c_ {~=m}

=

x-

, we have

~p (AN{T=p})

=

0

, which yields

m Z xj + B m ( A N { ~ = m } N B m , 2 ) 9=I {T=p}NBp, I = {T=p}NBp, 2 = ~

, which yields

140

T h u s we h a v e ~o

~T(A)

=

X ~p (An{r=p}) p=n m m ~Z x. + Z ~ p ( A N { x = p } N B p , 2) j=1 ] p=n

=

Let

H

denote

the

AN{T=p}NBp, 2 ~ @ Then

the a b o v e

set of all

, which

identity

p £ {n,n+1 ,... ,m}

is e q u i v a l e n t

to

satisfying

A N { T = p } N B p , 2 = Bp, 2 .

yields m

~T(A)

From

this

=

identity,

II ~..~ (s) for all

n 6~

Therefore, For

choose

II

<

II x II

+ 2p

,

, hence

set f u n c t i o n

process

which

n E~

x. + Z H X p 3

T 6 T(n)

reference, ~

Z j=1

we o b t a i n

and

the

later

process

x -

we also

~

exhibit

can be proven

such

for all

r 6 T

.

is a s e m i a m a r t .

another

b y the a b o v e

property

of t h e

argument.

Fix

set f u n c t i o n E 6 (0,~)

and

that

m

llxholds

for all

and

A6

the

last

F

Z

x

j=1

II +

II z H x

3

II

P

mqlW(n)

and

for e a c h

, choose mq~N(n) T i d e n t i t y for ~T(A)

<

-

and

finite

set

Hcl~(n)

Hcl~(n)

as a b o v e .

. For

T 6 T(n)

Then we have,

by

, m

~T(A)

II

This

yields,

II

<

for all

III ~,.~ III (n) Therefore, which

the

means

II

x-

x 6 T(n)

Xj

II + II Z H

Xp

II

<_

e

,

<__ 2E

set f u n c t i o n

that

Z

j=1

process

it is a s t r o n g

~

satisfies

potential

lim

(see S e c t i o n

Ill ~T III(~) = 0 , 3.4

for the

by

letting

definition). Finally,

for all

~ n (~)

n £~

, define

a stopping

time

p

,

if

~ £ Bp, 2 N B c n,1

n

,

if

~0 E Bn, I

:=

Tn £ T

141

Then we have n

n

z

II sx

p=1

II P

<

z

--

p=1

=

II sl~P ll(Bp, 2) + II SU n 11(Bn, I)

I1 S~ t

II (~) n

Letting

n

tend to infinity yields

Therefore,

the set function process

su b S~

II S ~ n

II(~) = ~

is not T-bounded.

We thus o b t a i n a first c h a r a c t e r i z a t i o n of finite d i m e n s i o n a l B a n a c h spaces in terms of set function processes:

3.2.6.

Corollary.

The f o l l o w i n g are equivalent: (a) (b)

~

has finite dimension.

Every ~ - b o u n d e d

s e m i a m a r t is T-bounded.

We also record the f o l l o w i n g obvious result:

3.2.7.

Theorem.

The class of all T - b o u n d e d set f u n c t i o n p r o c e s s e s is a B a n a c h space for the n o r m

II. II T

For the r e m a i n d e r of this chapter,

i :

F

>

let

[0,1]

be a fixed p r o b a b i l i t y measure.

If

~

is a set f u n c t i o n process,

the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e of will be d e n o t e d by

Dn~ n

for all

n 61~ .

,

~n

w i t h respect to

then Rnl

3.3.

M a r t i n @ a 1 e s .

The

results

of t h i s

martingales mostly

given

without

the proofs

proof

given

A set f u n c t i o n

section

are essentially

in S e c t i o n since,

They

are

apart

from

lattice

in t h e r e a l

process

~

the

2.3.

case carry

s a m e as t h o s e

stated

over

is a m a r t i n g a l e

on real

for reference

theoretical

and

arguments,

to t h e v e c t o r - v a l u e d

if the n e t

{ ~ T (Q)

case.

I T E T }

is c o n s t a n t .

3.3.1.

Theorem.

For a set function

process

~

, the following

are equivalent:

(a)

~

is a m a r t i n g a l e .

(b)

~

= RT~ O

holds

for all

• £ T

and

o 6 T(~)

holds

for all

n 6~

and

m £ ~ (n)

(c)

~n = Rn~m

(d)

~n

(e)

There

= Rn~n+1 exists

~n = Rn~ (f)

There ~T

(g)

If

~

= RT5

~r(~)

= ~(~)

is a m a r t i n g a l e ,

, will

measure

3.3.2. If

of

5C a(F

T C T

the

a martingale

~

, ~)

such that

, ~)

such that

.

measure

~E a(F • £ T

then the vector

be called

such that

.

for all

l i m ~n(A)

is a m a r t i n g a l e

process

II ~ II

sup~

Proof.

:=

n 6~

, ~)

.

measure

~E a(F

, ~)

given

,

limit measure

will

of

sometimes

~

. Again,

be denoted

the

by

limit

lim

~n

"

Theorem.

~

holds

holds

.

5£ a(F

measure

for all

a vector

n E~

measure

for all

a vector

holds

exists

for all

a vector

holds

exists

There

5(A)

A £ F

holds

for all

with

is a r e a l

II ~ n II (A)

limit measure

submartingale,

=

sup T

~

, then

and the

II IJ..~ II (A)

=

the

set function

identity

II ~. II (A)

A 6 F

For all

II ~.~ l l ( n )

zET

=

and

oET(z)

II R.~ a l l ( n )

, we have,

<

II u.a l l ( n )

by Lemma

,

3.2.2,

by

143

hence

II ~ H

is a real submartingale.

su~ A6 F

H ~ n H(A)

=

sup T

The identity

II Br H (A)

H ~ If(A)

,

, can be p r o v e n as in the real case.

3.3.3.

Corollary.

For a m a r t i n g a l e equivalent: (a)

, the f o l l o w i n g are

and its limit m e a s u r e

is ~ - b o u n d e d .

(b)

is T-bounded.

(c)

has b o u n d e d variation.

Moreover,

if

3.3.4.

Theorem.

is ~ - b o u n d e d ,

then

H _~ i~

The class of all ~ - b o u n d e d m a r t i n g a l e s on norm

=

11. i ~

=

If _~ fiT =

F

it ~ il (2)

is a Banach space for the

, and the map a s s o c i a t i n g w i t h each ~ - b o u n d e d m a r t i n g a l e

its limit m e a s u r e is an isometric i s o m o r p h i s m of the Banach space of all ~ - b o u n d e d m a r t i n g a l e s on

A martingale exists

6q

~

such that

a martingale

the real s u b m a r t i n g a l e

3.3.5.

onto

bva(F

, ~)

is u n i f o r m l y A - c o n t i n u o u s if for each

(0,~)

other words,

F

A(A) ~

< 6

implies

SU~N

c 6 (0,~)

II ~ n H(A)

there

< ~ . In

is u n i f o r m l y A - c o n t i n u o u s if and only if

it ~ II

is u n i f o r m l y A - c o n t i n u o u s .

Theorem.

For an ~ - b o u n d e d m a r t i n g a l e

~

and its limit m e a s u r e

, the following

are equivalent: (a)

~

is u n i f o r m l y A - c o n t i n u o u s .

(b)

~

is A - c o n t i n u o u s .

We thus have the L e b e s ~ u e d e c o m p o s i t i o n for

3.3.6.

~-bounded

martingales:

Theorem.

Every ~ - b o u n d e d m a r t i n g a l e is the sum of an ~ - b o u n d e d

uniformly

A - c o n t i n u o u s m a r t i n g a l e and an ~ - b o u n d e d m a r t i n g a l e w i t h A - s i n g u l a r limit measure. The d e c o m p o s i t i o n

is unique.

As in the real case,

the L e b e s g u e d e c o m p o s i t i o n can be used to split

the proof of the m a r t i n g a l e c o n v e r g e n c e t h e o r e m into two parts:

144

3.3.7.

Theorem.

Suppose If

~

~

has the R a d o n - N i k o d y m

is an ~ - b o u n d e d

lim Dn~ n 3.3.8. ~

=

D

lim ~n

martingale,

then

a.e.

Theorem.

Suppose If

property.

uniformly A-continuous

~

has the R a d o n - N i k o d y m property.

is an ~ - b o u n d e d

lim Dn~ n Combining

martingale with A-singular

=

0

these results,

limit measure,

then

a.e. we obtain the general martingale

convergence

theorem: 3.3.9. Suppose If

~

Corollary. ~

has the R a d o n - N i k o d y m

is an ~ - b o u n d e d

lim Dn~ n

martingale,

=

D

lim ~n

property. then

a.e.

It should be noted that, apart from the definition of the g e n e r a l i z e d Radon-Nikodym

derivatives,

the R a d o n - N i k o d y m property

the proof of the convergence martingale.

Thus,

if

~

is needed only in

of the uniformly A-continuous

is an ~ - b o u n d e d

part of the

m a r t i n g a l e with A-singular

limit measure which results from integrating a m a r t i n g a l e of random variables,

then

lim Dn~ n = 0

not have the R a d o n - N i k o d y m

a.e. holds even if the Banach space does

property;

see also

[49; T h e o r e m V.2.9].

3.4.

S t r o n ~

a m a r t s .

Strong amarts

form the i m m e d i a t e

vector-valued

case.

turns out that strong remarked

amarts have

at the b e g i n n i n g

not be T-bounded,

generalization

and even in the case of a T - b o u n d e d

Radon-Nikodym

property

derivatives

A set f u n c t i o n

process

~

dual,

need not converge

As a l r e a d y

becomes

in a B a n a c h

useless,

space with

the g e n e r a l i z e d

strongly

is a stron9 a m a r t

it

strong a m a r t s n e e d

inequality

strong a m a r t

and a s e p a r a b l e

to the

since

rather weak properties.

of this chapter, ~ - b o u n d e d

in w h i c h case the m a x i m a l

the R a d o n - N i k o d y m

of real amarts

Their name may be somewhat m i s l e a d i n g

b u t only weakly.

if the net

{ ~T(~)

I T E T }

is n o r m c o n v e r g e n t .

3.4.1. Every

Lemma. strong a m a r t

The proof This

of this

is a semiamart.

lemma

is the same as in the real case

is also true for the proof

strong amarts

3.4.2.

in terms

of the f o l l o w i n g

of their limit m e a s u r e

2.5.2).

(see T h e o r e m

of

2.5.4):

Theorem.

For a set f u n c t i o n p r o c e s s , the f o l l o w i n g (a) is a strong amart.

(b)

There exists

(C)

There

Ill ~ T - R T ~

lim

~(A) (d)

exists

Ill(Q)

= 0

are equivalent:

~£a(F

, ~)

such that

~ E a(F

, ~)

such that

, ~)

such that

.

a vector measure holds

for all

a vector measure

A£ F ~ C a(F

= lim ~ ( ~ )

The next r e s u l t

is the d i f f e r e n c e

the limit m e a s u r e

3.4.3.

a vector measure

= lim ~T(A)

There e x i s t s ~(~)

property

for strong amarts,

in w h i c h

is not involved:

Corollary.

F o r a set f u n c t i o n

process

(a)

~

(b)

lim suPT(T )

Again,

(Lemma

characterization

, the f o l l o w i n g

are e q u i v a l e n t :

is a strong amart.

the proof

provided

~

III ~ -R ~

lll(n) = 0

is the same as in the real case

the v a r i a t i o n

n o r m is r e p l a c e d

(Corollary

by the s e m i v a r i a t i o n

2.5.5), norm.

146

As a first and important difference between real amarts and strong amarts,

we remark that the semivariation

norm appearing

in the preceding

results cannot in general be replaced by the v a r i a t i o n norm. This is also true for the potential part occuring for Y - b o u n d e d

strong amarts.

A set function process { Ill ~T III(~) I T E T }

~

is a stron9 potential

converges

to

an ~ - b o u n d e d

strong amarts:

strong amart is the sum of an ~ - b o u n d e d

Consider an ~ - b o u n d e d

e 6 (0,~)

then so is the strong potential.

strong amart

. For each partition

{AI,A 2 .... , ~ } 6 Pn(Q)

k Z i=I

II ~(A i) II

~

with limit measure

{AI,A2,...,~) and

E P (~)

Z II ~(A i) - ~n(Ai)

, choose

licit(n) and it follows

_~

_<

_<

k Z (II ~(A i) - B n ( A i) II + II ~n(Ai) IIh/ i=I

<

E + l:~n ll(S)

:=

{ Rn5

~

and Corollary

3.3.3 that

I n 61%1 }

martingale,

is a strong potential, if

,

from Theorem 3.3.1

is an ~ - b o u n d e d

Moreover,

ll~tL~

hence

by Theorem 3.4.2, and it is also ~ - b o u n d e d .

has a Riesz decomposition. ~

is an arbitrary

lim ~n = 0 . Thus,

if

~

strong potential,

is an ~ - b o u n d e d

then we have

martingale

and

~ . n 6~

II ~ e . Then

This yields

Therefore,

and

is unique.

If the strong amart is T-bounded,

satisfying we have

martingale

strong potential.

The d e c o m p o s i t i o n

Proof.

for ~ - b o u n d e d

Theorem.

Every ~ - b o u n d e d

Fix

if the net

0 .

We can now prove the Riesz d e c o m p o s i t i o n 3.4.4.

in the Riesz d e c o m p o s i t i o n

~

is

147

an~-bounded

strong p o t e n t i a l s a t i s f y i n g

lim ~n hence

~ = ~

=

lim ~n

=

~

~ = @ + ~ , then we h a v e

'

, by T h e o r e m 3.3.1. Therefore,

the Riesz d e c o m p o s i t i o n is

unique. The final a s s e r t i o n c o n c e r n i n g T - b o u n d e d n e s s

is obvious since

every ~ - b o u n d e d m a r t i n g a l e is T-bounded, by C o r o l l a r y 3.3.3.

F r o m the f o l l o w i n g c h a r a c t e r i z a t i o n of a b s o l u t e l y summing operators,

it

can be seen that the b o u n d e d n e s s p r o p e r t i e s of strong amarts d e p e n d on the d i m e n s i o n of the B a n a c h space.

3.4.5.

Theorem.

Suppose

~

and

~

are Banach spaces and

S :~

is a b o u n d e d

>

linear operator. Then the following are equivalent: (a) S is a b s o l u t e l y summing. S

(b) (c)

maps the strong p o t e n t i a l s in

~

into the T - b o u n d e d set

f u n c t i o n p r o c e s s e s in

~

S

strong p o t e n t i a l s in

maps the ~ - b o u n d e d

.

T - b o u n d e d set f u n c t i o n p r o c e s s e s in (d)

S

maps the ~ - b o u n d e d

~

Proof.

Suppose first that

strong p o t e n t i a l in

~

II S~T I{ (~) hence

II S~ li

(c). Moreover,

then there exists an ~ - b o u n d e d S~

3~4.6.

(c) and

~

is a

,

(a) implies if

S

(b).

is not a b s o l u t e l y summing,

strong p o t e n t i a l

~

is not T-bounded, by Example 3.2.5. Therefore,

Finally,

If

~ £ T ,

and it follows that the value

is finite. Therefore,

(b) implies

for all

II S llas III ~T III (Q)

<

.

is a b s o l u t e l y summing.

, then we have,

is a real potential,

sup T li S~ T li(~) Obviously,

S

~

into the

into the

strong amarts in

T - b o u n d e d set function p r o c e s s e s in

~

.

in

~

such that

(c) implies

(d) are e q u i v a l e n t by the Riesz d e c o m p o s i t i o n ,

Corollary.

The following are equivalent: (a)

~

(b)

Every strong potential

has finite dimension.

(c)

Every ~ - b o u n d e d

strong p o t e n t i a l

(d)

Every ~ - b o u n d e d

strong a m a r t is T-bounded.

is T-bounded. is T-bounded.

(a). o

148

Another

deficiency

poor b o u n d e d n e s s theorem.

Even

a separable

this

3.6.7

amarts,

which

is the a b s e n s e

space h a v i n g

since

severe

of a T - b o u n d e d

than their

of a strong c o n v e r g e n c e

obtains

property

and

for the g e n e r a l i z e d

strong amart.

it is a c o n s e q u e n c e

and its corollaries.

is more

the R a d o n - N i k o d y m

only w e a k c o n v e r g e n c e

derivatives

result here

Theorem

properties,

in a B a n a c h

dual,

Radon-Nikodym

of strong

We do n o t p r o v e

of a more g e n e r a l

one;

see

3.5.

U n i f o r m

Although

strong

boundedness than

are

defined

and convergence

those

of real

essentially

the

f r o m the R i e s z due

amarts

a m a r t s

to t h e i r

decomposition

which

to e x p e c t

and actually

for t h o s e

strong

satisfying

II ~T I1(~)

= 0

lim

process

limit measure

converges

Without

which

to

3.5.1.

strong

evident

amarts

are

in t e r m s

by variations,

it

results

a potential

part

condition

to the

limit

that

amart

the n e t

if it is a s t r o n g

{ II ~ T - R T ~

JJ(Q)

amart

I T E T

}

.

measure,

difference

uniform

amarts

following

are

m a y be c h a r a c t e r i z e d

property:

Theorem.

F o r a set f u n c t i o n (a)

~

(b)

lim

Proof.

Suppose

process

is a u n i f o r m suPT(r )

. T h e n we have,

~

, the

first

that

for all

equivalent:

amart.

II ~ T - R T ~ o

II t~.~-RTI~ a II(s)

II(~) = 0 .

~

T £ T

5_

is a u n i f o r m

amart

and

,

a £ T(T)

I1 1.<~-R1;~- I1(~)

with

yields

Conversely,

lim suPT(T ) suppose

lim Fix

e E (0,~)

suPT(~)

II ~ - R ~ B a Jl(~) = 0 .

that

suPT(T )

II ~ -

Jl ~ r - R T ~ o Jl(~) and choose

R T ~ o II (n)

~ ET

<

=

0 such

limit measure

+ II RI:(Rag.-1.L a) II(n)

<-- JJ ~r- RT5 JJ (n) + II Ro~-~a

holds.

have

is t h e n

satisfactory

have

of the w e a k e r

is a u n i f o r m

such

0

appeal

~

~

by the f o l l o w i n g

which

satisfactory

are defined

be replaced

that more

instead

of

their

III (~) = 0 .

A set f u n c t i o n with

true amarts

It

potentials

in g e n e r a l

can be obtained

lira III ~

strong

less

amarts,

martingales

martingales.

the d e f i c i e n c i e s

Since

cannot

in g e n e r a l

vector-valued

as real

that

part.

same w a y as real

are

Contrarily,

properties

potential

of s e m i v a r i a t i o n s is n a t u r a l

properties

amarts°

same

in the

that

jj (Q)

'

IS0 holds

for all

T 6 T(x)

II ~ ( ~ ) for all limit

-~o(n)

T, o 6 T(M)

measure

oqT(~)

such k Z i=I

. This

of

II

<

, hence

~

. For

that

yields

e ~

is a s t r o n g

T E T(x)

and

II ~ ( A i) - ~ o ( A i )

X

li ~T(Ai)-~(A i) II ~

k Z i=I

amart.

Let

~

{ A I , A 2 .... , ~ }

denote

6 ~T(~)

the

, choose

il ~ ~ . T h e n w e h a v e

II ~T(Ai)-~o(Ai)

k Z II ~ o ( A i ) - ~ ( A i ) i=I

il +

il ~r - R r ~ o If(n) + e

SUPT(T ) This yields

II ~T - RT5 II(n) for all

r £ T(~)

A set f u n c t i o n {

, hence

process

II ~T II(~) I ~ £ T } is a u n i f o r m

~

potential

for e a c h u n i f o r m ~'

is a u n i f o r m

Therefore,

3.5.2.

Theorem.

The c l a s s

of all

amart.

potential

0 . Clearly,

every

potential

if the

set f u n c t i o n

uniform ~

if the n e t a set f u n c t i o n

potential

, there

exists

process

process

II ~ II

is T - b o u n d e d . a real

Doob

II ~ II ~ ~' , by L e m m a 2.5.6. We a l s o h a v e

satisfying obvious

to

if a n d o n l y

Moreover,

following

~

,

is a u n i f o r m

potential.

the

2~

converges

is a r e a l

potential

~

result:

uniform

potentials

is a B a n a c h

space

for t h e n o r m

II. IIT From

the d e f i n i t i o n s

Riesz

decomposition

3.5.3. Every

of u n i f o r m

amarts

and uniform

for u n i f o r m

amarts

is a l m o s t

potentials,

the

evident:

Theorem. uniform

amart

The decomposition If the u n i f o r m

Proof.

amart

Consider that

and

a uniform

potential.

is ~ - b o u n d e d ,

amart

then

_~

so is the m a r t i n g a l e .

with

limit measure

~

. Choose

II ~n-Rn~ II (~) < I h o l d s f o r a l l n 61~(k) . T h e n we II ~n ll(n) + I , h e n c e R n ~ £ b v a ( F n , ]E) , for all

such

have

II R n ~ II(~) < , and

sum of a m a r t i n g a l e

a uniform

k £I~

n £3W(k)

is the

is u n i q u e .

thus

for all

n 6~

since

R

n

is a c o n t r a c t i o n .

II

151 Therefore,

the limit m e a s u r e

:= which

{ Rn~ I n 6 ~

is a m a r t i n g a l e ,

is a u n i f o r m Therefore,

~

defines

a set f u n c t i o n

process

}

and it is c l e a r

that the set f u n c t i o n

process

potential. ~

has a Riesz

The u n i q u e n e s s

decomposition

of the Riesz

~ = ~ + ~

decomposition

case or as in the proof

of the Riesz d e c o m p o s i t i o n

Finally,

amart

if the u n i f o r m

the m a r t i n g a l e ,

since

amarts.

In p a r t i c u l a r ,

3.5.4.

Corollary.

For a u n i f o r m a m a r t

is ~ - b o u n d e d ,

plays a c e n t r a l

role

we h a v e the f o l l o w i n g

~

as in the real

for strong amarts.

then the same is true for

every u n i f o r m p o t e n t i a l

The Riesz d e c o m p o s i t i o n

.

can be p r o v e n

is T-bounded.

u

in the theory of u n i f o r m corollaries:

, the f o l l o w i n g

and its limit m e a s u r e

are

equivalent: (a)

~

(b)

~

is T-bounded.

(c)

~

has b o u n d e d variation.

Proof.

Since u n i f o r m p o t e n t i a l s

equivalent

is ~ - b o u n d e d .

by the Riesz

are T-bounded,

decomposition

u n i f o r m a m a r t has the same limit m e a s u r e Riesz d e c o m p o s i t i o n ,

3.5.5. If

~

(a) and

as the m a r t i n g a l e

(c) are e q u i v a l e n t

process

uniform II ~ II

lira II ~T II (A)

Proof.

(b) are

3.3.3.

Since a of its

by C o r o l l a r y

3.3.3.

Corollary. is an ~ - b o u n d e d

set f u n c t i o n

holds

(a) and

and C o r o l l a r y

for all

is a b o u n d e d

limit m e a s u r e real amart,

~ , then the

and the i d e n t i t y

II 5 II (A)

A 6 F

Consider

lim

=

amart with

A 6 I: . By the Riesz

III ~T II (A) - I{ R T ~ II (A) I

<

decomposition,

lim

II ~ - R T ~

we have

II (A)

=

0

,

152

and Theorem

3.3.2

I II R T ~ II (A) - II ~ II (A) I

lim By

the t r i a n g l e

lim for all

As

inequality,

real

in the

. In p a r t i c u l a r ,

obtain

the

the R i e s z

of u n i f o r m

=

0

,

set f u n c t i o n

is a

II ~ II

process

decomposition

also yields

the

following

amarts:

Corollary.

F o r a set f u n c t i o n (a)

~

(b)

There

process

is a u n i f o r m exists

Proof.

Suppose

martingale

~

potential, majorized

hence

~

result

T-bounded

that

exists ~

II

, then

amart

Then real

~- 5

the

is a u n i f o r m

potential

, by L e m m a ~

and consider

~ - ~

which

is

2.5.6.

a n d a real

Doob

is a u n i f o r m

potential

potential,

the

o

structure

of the c l a s s

of all ~ - b o u n d e d ,

uniform

amarts

is a B a n a c h

space

for

the

.

Consider amarts

and

a Cauchy let

T-bounded

set f u n c t i o n

and

,

m E~

potential

amarts:

of all ~ - b o u n d e d

uniform

~'

a martingale

< ~'

describes uniform

Theorem.

Proof.

Doob

amart,

3.5.7.

II. IIT

is a u n i f o r m

potential

The c l a s s norm

~

is a p o s i t i v e

II

- ~

Doob

II ~ -

are equivalent:

a n d a real

II ~

is a u n i f o r m

The n e x t

~

decomposition.

if t h e r e

satisfying

hence

following

its R i e s z

by a real

Conversely,

, the

II ~ - ~ il < ~'

first

of

~

amart.

a martingale

satisfying

hence

0

Q

case,

characterization

~'

=

amart.

real

3.5.6.

we then

III ~T If(A) -II 5 II(A) I

A E F

bounded

yields

~

sequence denote

processes.

II ~ x - R : ~ o II (n) ~

{ ~(m)

its

limit

I m E~

of K - b o u n d e d

in the B a n a c h

Then we have,

II ~-~(m)

}

for all

space r E T

,

of all a 6 T(T)

iiT + II ~:(m) -R:~o(m) II (S) + II _B(m)-~_ iiT

15S Fix

e E (0,~)

, choose

II u -

and choose

~ £ T

such

~T(m)

II holds

U (m) IIT

for all

m E~

such

<_

,

E

that

that

- R x ~ o(m) ll(n)

T E T(~)

and

<

E

o 6 T(T)

, by the d i f f e r e n c e

property.

T h e n we h a v e

II ~ T - RTU o t l ( n )

~

3e

for all

T £ T(~)

and

property

that

is a u n i f o r m

Before

~

studying

include

of s t r o n g

characterization

3.5.8. ~

and

~

operator.

the d i f f e r e n c e

uniform

of a b s o l u t e l y amarts.

dimensional

are B a n a c h

Then

the

S

is a b s o l u t e l y

(b)

S

maps

uniform (c)

S

Proof.

maps

Banach

This

amart,

summing

will

lead

let us

operators to a n o t h e r

spaces.

potentials

in

Suppose

first

that

S

potential

in

in

~

since

II S~ T II (~) for all if

T £T ~

<

~

> ~

is a b o u n d e d

potentials

in

~

into

the

. strong

amarts

in

~

into

the

is a b s o l u t e l y ~

, then

summing.

S~

is a u n i f o r m

potential

S~

is a u n i f o r m

amart

Hl ~T Ill (~)

.

is a s t r o n g

T E T

:~

.

II S llas

II S ( ~ r - R r B O) II(~) for all

S

equivalent:

strong ~

the ( ~ - b o u n d e d ) in

is a s t r o n g

and

are

summing.

the ( ~ - b o u n d e d )

amarts

~

Similarly,

spaces

following

uniform

If

holds

of an ~ - b o u n d e d

and uniform

of f i n i t e

from

amart.

characterization

amarts

(a)

holds

it f o l l o w s

Theorem.

Suppose linear

. Now

the c o n v e r g e n c e

the following

in t e r m s

o E T(T)

,

and

amart,

~

o £ T(r)

then

since

II S llas III ( B ~ - R T ~ O) III(~) , and by the d i f f e r e n c e

properties

154 for strong amarts and u n i f o r m amarts. Conversely,

if

an ~ - b o u n d e d

S

is not a b s o l u t e l y summing, then there exists

strong p o t e n t i a l

~

Since the set f u n c t i o n process

in S~

~

such that

S~

is not T-bounded.

is clearly ~ - b o u n d e d ,

a u n i f o r m amart, by C o r o l l a r y 3.5.4.

In particular,

S~

it c a n n o t be cannot be a

u n i f o r m potential,

3.5.9.

u

Corollary.

The f o l l o w i n g are equivalent: (a)

~

(b)

Every (~-bounded)

has finite dimension. strong p o t e n t i a l is a u n i f o r m potential.

(c)

Every (~-bounded)

strong a m a r t is a u n i f o r m amart.

Let us now study the c o n v e r g e n c e of the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s of an P - b o u n d e d

u n i f o r m amart. E x c e p t for the r e q u i r e m e n t

that the B a n a c h space have the R a d o n - N i k o d y m property, w h i c h is even n e c e s s a r y in the case of m a r t i n g a l e s ,

the results o b t a i n e d for real

amarts e x t e n d to u n i f o r m amarts. Moreover,

the p r o o f s g i v e n in the real

case c a r r y over to the v e c t o r - v a l u e d case where v e c t o r m e a s u r e s of b o u n d e d v a r i a t i o n take the place of b o u n d e d real measures. First,

let

us note that L e m m a 2.5.11 extends to the v e c t o r - v a l u e d case. We thus obtain the f o l l o w i n g m a x i m a l inequality:

3.5.10. Suppose If

~

Lemma. ~

has the R a d o n - N i k o d y m property.

is a set f u n c t i o n process,

then

e(J A) ( { s u B ( k ) II Dn~ n II > E}) holds for all

~ E (0,~)

As in the real case,

and

k 6~

the m a x i m a l

<

suPT(k ) II ~T II (n)

.

inequality leads to the c o n v e r g e n c e of

the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s of a u n i f o r m potential.

This

is the u n i f o r m p o t e n t i a l c o n v e r g e n c e theorem:

3.5.11. Suppose If

~

Theorem. ~

has the R a d o n - N i k o d y m property.

is a u n i f o r m potential,

lim DnB n

=

0

then

a.e.

We remark that in the m a x i m a l i n e q u a l i t y and in the u n i f o r m p o t e n t i a l

155 c o n v e r g e n c e t h e o r e m the R a d o n - N i k o d y m p r o p e r t y only enters in the d e f i n i t i o n of the g e n e r a l i z e d R a d o n - N i k o d y m derivatives.

Thus,

if

is a u n i f o r m p o t e n t i a l w h i c h r e s u l t s from i n t e g r a t i n g a u n i f o r m p o t e n t i a l of r a n d o m variables,

then

lim D n ~ n = 0

a.e. holds even if

the Banach space does not h a v e the R a d o n - N i k o d y m property; remark f o l l o w i n g the m a r t i n g a l e c o n v e r g e n c e t h e o r e m

see a l s o the

(Corollary 3.3.9).

A l s o as in the real case, by the Riesz d e c o m p o s i t i o n for u n i f o r m amarts, the u n i f o r m amart c o n v e r g e n c e t h e o r e m is a c o n s e q u e n c e of the m a r t i n g a l e c o n v e r g e n c e t h e o r e m and the u n i f o r m p o t e n t i a l c o n v e r g e n c e theorem:

3:5.12. Suppose If

~

Corollary. ~

has the R a d o n - N i k o d y m property.

is an N - b o u n d e d

lim DnB n

=

u n i f o r m amart, then

D

lim ~n

a.e.

By C o r o l l a r y 3.5.6, the u n i f o r m amart c o n v e r g e n c e t h e o r e m may also be stated in the f o l l o w i n g form:

3.5.13. Suppose If

~

Corollary. ~

has the R a d o n - N i k o d y m property.

is an N - b o u n d e d

martingale

~

set f u n c t i o n process such that there exists a

and a real Doob p o t e n t i a l

~'

satisfying

II ~ - ~ ~I < ~'

then

lim Dn~ n

=

D

lim ~n

a.e.

We c o n c l u d e this section on u n i f o r m amarts with a result c o n c e r n i n g quasimartingales.

A set function process Z II ~ n - R n ~ n + 1 H (~) 3.5.14.

~

is a ~ u a s i m a r t i n g a l e

if the series

is convergent.

Theorem.

Every q u a s i m a r t i n g a l e is a u n i f o r m amart.

Proof. k £I~

Consider a quasimartingale such that

~-

n=k

il ~.n-Rn~n+l

II (~q)

<

~

. Fix

E 6 (0,~)

and c h o o s e

156 T h e n w e have, 1 X i=I

f o r all

TET(k)

,

{ A I , A 2 , . . . , A I} 6 Pt(~)

li ~T(Ai) -%Im(A i) I[

<

1 Z Z i=I n=k

and

II ~ n - R n ~ n + 1

mE~l(T)

11 (A i)

oo

where

the f i r s t i n e q u a l i t y

<_

X n=k

<

~

tl lln-Rnlln+ 1 II (n)

,

is P r O v e n as in the real c a s e

( T h e o r e m 2.5.1).

This yields

11 ~tfor all

T E T(k)

RT~m I1(~) and

~

m£~(r)

II Rt1-~0 - R.r]/m I1 (n) for all

T ET(k)

,

for all

• 6 T(k)

and

property.

, . In p a r t i c u l a r ,

_<

o E T(T)

II ~T - R r B o II(~)

difference

c

II 11o - Rol"~m II (n)

and

~

o E T(~)

2e

mE~(o)

we o b t a i n

<

E

,

. This yields

,

, hence

~

is a u n i f o r m

amart,

b y the Q

3.6.

Weak

amar

t s ,

u n i f o r m and

weak

The intention processes,

sequential

of g e n e r a l i z i n g

amarts.

for weak

for strong obtains,

strong amarts

r t s

to a larger class of

obtains

led to the n o t i o n s

under

the same c o n d i t i o n s

of w e a k a m a r t s

just as the strong c o n v e r g e n c e

For weak

and we shall

sequential

see that this

which generalize

weak

In what

we shall w r i t e

follows,

ama

and w e a k

It turned out that the weak c o n v e r g e n c e

amarts,

amarts.

r t s ,

s e q u e n t i a l

for w h i c h w e a k c o n v e r g e n c e

as for strong amarts,

fail

ama

weak

sequential

amarts,

t h e o r e m may

t h e o r e m may fail

however,

weak c o n v e r g e n c e

is also true for u n i f o r m weak amarts,

amarts.

w-lim

for the weak

limit of a w e a k l y

A set f u n c t i o n is w e a k l y

process

convergent.

~

for all

A £ F

The a b o v e - m e n t i o n e d

and this weakest

, although

{ ~T(A)

if the net deficiency

I ~ £ T }

it is e a s i l y

reasonable

a set f u n c t i o n to

~

for all

A E F

process

such that the sequence

the net

. This

I n 6~

comes

weakly

the

into a m a r t i n g a l e

and

{ ~T(A)

leads

}

to a limit measure,

need not p o s s e s s

I ~ 6T }

to the f o l l o w i n g

is a u n i f o r m weak a m a r t { ~n (A)

of weak a m a r t s

weakly

decomposition

for w h i c h

I r 6 T }

seen to be a w e a k C a u c h y net.

that weak amarts

form of a Riesz

process 0

A set f u n c t i o n

to saying

{ ~T (~)

n e e d not c o n v e r g e

that w e a k amarts n e e d not c o n v e r g e

is e q u i v a l e n t

converges

net or sequence.

is a weak a m a r t

from the fact that the net

This m e a n s

convergent

is w e a k l y

weakly definition:

if it is a w e a k a m a r t convergent

for all

A £ F The d i f f e r e n c e

b e t w e e n weak

by the f o l l o w i n g

amarts

characterization

and u n i f o r m w e a k of w e a k l y

spaces:

3.6.1.

Theorem.

The f o l l o w i n g (a) (b)

~

are equivalent: is w e a k l y

sequentially

E v e r y weak a m a r t

amarts

sequentially

complete.

is a u n i f o r m w e a k amart.

is c l a r i f i e d

complete

Banach

158

Proof.

Suppose

consider For

a weak

first

amart

n, m 6 ~ ( k )

that _B . F o r

, define

a(~)

~

is w e a k l y AC

F~

sequentially

, choose

stopping

times

~,

n

,

if

~EA

nvm

,

if

0~ £ ~ A

m

,

if

~ £A

nvm

,

if

~ £ ~A

k 6~

~ £ T(k)

complete

such

and

that

A£

Fk

by letting

:=

and

(~)

:--

Then we have

Bn(A) Therefore, convergent uniform

- ~m(A)

{ ~n (A) since

amart.

The c o n v e r s e

c a n be

3.6.2. Suppose Then

}

is a w e a k

is w e a k l y

seen

- BT(~)

from

Cauchy

sequentially

the

sequence,

complete.

subsequent

Example

hence

Thus,

~

weakly is a

3.6.2.

Example. ~

there

not weakly F o r all

~o(Q)

I n 6~

~

weak

=

is n o t w e a k l y exists

stochastic

Cauchy

complete.

sequence

{ x n 6~

I n 6~

}

which

is

convergent.

n C~

generated

a weak

sequentially

by

, let the

F

sets

basis

~

be a c o p y

n

B1, 1 :=

:= { F n

of the a l g e b r a

[0,2 -I )

I n 6~

and

} , define

on

B1, 2 :=

[0,1) [2-1,1)

a set f u n c t i o n

which

is

. On the process

by letting

:=

~n(B1,k )

Then

the net

sequence Therefore,

{ ~T(~)

{ ~n(B1,1 ) the

to be a u n i f o r m

As a c o n s e q u e n c e

set

i

xn

,

if

k = I

[

-x n

,

if

k = 2

I ~ E T I n £~

function

weak

} }

is w e a k l y

convergent

is n o t w e a k l y

process

~

to

0 , b u t the

convergent.

is a w e a k

amart,

but

it f a i l s

amart.

of T h e o r e m

3.6.1,

we g e t t h e

following

result:

.

15g

Corollary.

3.6.3. Suppose

has

(a)

a separable

dual.

Then

the

following

are equivalent:

is r e f l e x i v e .

(b)

Every

Proof.

Each

and a weakly

weak

amart

reflexive

is a u n i f o r m

Banach

sequentially

space

complete

weak

amart.

is w e a k l y

Banach

space

sequentially having

complete,

a separable

dual

is r e f l e x i v e .

Similar

to s t r o n g

characterized

amarts

in t e r m s

3.6.4.

Theorem.

F o r a set

function

(a)

~

(b)

There

(c)

There

and uniform

of t h e i r

process

~

is a u n i f o r m

lim

exists

exists = w-lim

Proof.

Suppose

Consider

A £ F

and choose

m £~(T)

and define

(~)

first

following

measure

= 0

a vector ~T(A)

are

~ C a(F

holds

weak

amarts

m a y be

equivalent:

~

~ C a(F

for all

such

a stopping

that time

I

T(~)

,

if

~ 6A

I

m

,

if

~ £ ~A

such

that

e' £ ~ ' , ~)

such

that

A E F

is a u n i f o r m

~ £ T

, ~)

for all

measure

holds

that

uniform

amart.

a vector

le'(~r-Rr~)l(g)

~(A)

choose

, the

weak

amarts,

limit measure:

weak A £ F

amart. M

. For

• £ T(~)

~ C T(r)

by l e t t i n g

is w e a k l y

convergent.

:=

Then we have

~T(A) It f o l l o w s define

=

~v(~)

- ~m(~A)

that

the n e t

{ ~T(A)

a vector

measure

~ 6 a(F

~(A)

for all

A 6 F

Consider

now

:=

e' 61R'

w-lim

by

}

letting

~T(A)

. Fix

l e ' (~"u ( ~ ) - ~ ' ( D ) )

I T £ T , ~)

I

~ 6 (0,~)

<

and choose

M E T

such

that

Now

160 holds

for all

v 6 T(M)

. For

T £ T(~)

and

A6

F

T

, choose

m6~(T)

such that

le'(~m(~A)-5(~A))

and define

a stopping

(~)

i

time

~

e

,

v £ T(r)

by

letting

~(w)

,

if

~ 6 A

m

,

if

~ 6 ~A

:=

Then we have

le'(Bz(A)-~(A))I

It f o l l o w s

for all

T 6 T(~)

The remaining

3.6.5.

~

<

4s

(a)

implies

(b)

are obvious.

~

is w e a k l y

sequentially

is a set f u n c t i o n ~

(b)

There

Proof.

exists = w-lim

Combine

A set function

for all

A E F

process

~

3.6.4

~

the

measure

following

~6 a(F

and Theorem

is a u n i f o r m

sequence

. I t is c l e a r

We can now prove

the

are equivalent:

, ~)

such that

~r(~)

process

e' 6 ~ '

complete. then

amart.

a vector

is a u n i f o r m

for all

weak

Theorem

such that the

amarts:

process,

is a u n i f o r m

~(n)

holds

2s

. Therefore,

assertions

(a)

amart

<

+ le'(~m(Q~A)-5(Q~A))I

Corollary.

Suppose If

le'(~v(~)-~(~))l

that

le' (~r - RT~) I (n)

holds

~

weak

{ ~ n (A)

weak I n 6~

from Theorem potential

3.6.1.

D

potential

if it is a w e a k

}

converges

3.6.4

weakly

to

if a n d o n l y

if

lim

[e'~Tl(O)

.

Riesz

decomposition

0

that a set function

for H-bounded

uniform

weak

= 0

161

3.6.6.

Theorem.

Every ~ - b o u n d e d

u n i f o r m weak amart is the sum of an ~ - b o u n d e d

and an ~ - b o u n d e d

martingale

u n i f o r m weak potential.

The decomposition

is unique.

If the u n i f o r m weak amart is T-bounded,

then so is the u n i f o r m weak

potential. Proof. measure choose

Consider an ~ - b o u n d e d ~ . Fix

e E (0,~)

e~, e~ . . . . .

holds for all

e~ 6 U ( ~ ' )

i £ {I,2,...,k}

{AI,A 2 ..... A k} £ Pn(~) k X i=1

uniform weak amart

. For each partition

and

[[ ~(A i) H

such that , and choose

~

II ~(A i) II = n E~

with limit

{A1,A2,..., ~ }

6 P (~)

ei~(A i)

satisfying

Z iei~(Ai)-elBn(Ai) [ ~ e . Then we have

=

k X el~(A i) i=1

<

E +

<

e +

<

e + I[ ~n II (~)

k

Z i=1

le:~ln(Ai) [

k

Z i=1

t[ ~n II (A i)

This yields

II ~ II(n)

_<

il_~

I1~

,

and it follows from T h e o r e m 3.3. I and C o r o l l a r y

_~

:=

is an ~ - b o u n d e d

_~

=

is an ~ - b o u n d e d

{ Rn~

I n£~

martingale,

3.3.3 that

} hence the set function process

_~-_~ u n i f o r m weak potential.

The remaining assertions

can be proven as usual;

see the proof of

Theorem 3.4.4. Let us now study the convergence derivatives

of the g e n e r a l i z e d

Radon-Nikodym

of a u n i f o r m weak amart. The main result is the following

162

u n i f o r m weak potential 3.6.7.

theorem:

Theorem.

Suppose If

convergence

~

~

has the R a d o n - N i k o d y m

property and a separable dual.

is a T - b o u n d e d u n i f o r m weak potential,

w - l i m Dn~ n Proof.

Since

(Lemma 3.5.10)

~

=

0

then

a.e.

is T-bounded,

it follows from the maximal

that there exists a null set

A CL

inequality

such that the value

II (Dn~ n) (~) [I

su~

is finite for all

~ C Q~A

.

Now consider a sequence For each

{ e~ E ~ ' [ J 6 ~ } which is dense in 3 , there exists a null set A~ 6 L such that J

j 6~

lim

(e3Dn~ n) (~)

=

lim

(Dnei~ n) (~)

=

0

~ E ~kA. • by T h e o r e m 3.1.11 and T h e o r e m 2.5.13. 3 and ~ 6 ~ A ~ ( U ~ Aj) , the right hand side of for each e' E~'

holds for all Thus,

the inequality I (e'Dn~ n) (~) l

< --

II e'-e'j II II (Dn~ n) (~) II + l(e~Dn~ n) (c0) l

can be made a r b i t r a r i l y

small by a suitable choice of

all

large. This yields

n £~

sufficiently

lim for all

(e'Dn~n) (~)

e' 6 ~ '

and

=

0

~ E ~A~(

j 6~

and for

,

U ~ A 5) , from which the assertion

follows. By the Riesz decomposition, is a c o n s e q u e n c e weak potential 3.6.8. Suppose If

~

the u n i f o r m weak amart conver@ence

of the m a r t i n g a l e

convergence

convergence

theorem

theorem and the u n i f o r m

theorem:

Corollary. ~

has the R a d o n - N i k o d y m

property

is a T - b o u n d e d u n i f o r m weak amart,

w-lim Dn~ n

=

D

w - l i m ~n

a.e.

and a separable dual. then

163

It can be seen from E x a m p l e t h e o r e m does not e x t e n d

since every

strong a m a r t theorem

theorem:

Corollary.

Suppose ~

~

has the R a d o n - N i k o d y m

is a T - b o u n d e d

=

D

extend

of a T - b o u n d e d

fails to c o n v e r g e

in every strong

due to W.J.

strong amarts.

infinite

Chacon

strong a m a r t

strongly.

dimensional

Davis

and q u o t e d by Chacon

Banach

this

theorem

and S u c h e s t o n

in a r e f l e x i v e

More generally,

amart w h i c h does not c o n v e r g e

We c o n c l u d e

dual.

a.e.

[33] that the strong a m a r t c o n v e r g e n c e

to ~ - b o u n d e d

an example

and a s e p a r a b l e

then

w - l i m ~n

It can be seen from an e x a m p l e and S u c h e s t o n

property

strong amart,

w-lim DnB n

which

However,

the u n i f o r m w e a k a m a r t c o n v e r g e n c e

the stron9 a m a r t c o n v e r g e n c e

3.6.9.

If

that the u n i f o r m w e a k amart c o n v e r g e n c e

to weak amarts.

is a u n i f o r m w e a k amart, conta i n s

3.6.2

space

Banach

Bellow

there exists

does not

[33] also gave space

[7] p r o v e d

that

a T-bounded

strongly.

s e c t i o n w i t h a brief

discussion

of weak

sequential

amarts.

A set f u n c t i o n { ~Tn (~) { ~n E T

I n6~

3.6.10.

Next,

}

~

is a w e a k

is w e a k l y

amart

for each

if the s e q u e n c e

increasing

sequence

} .

sequential

amart

is a u n i f o r m amart.

F i r s t note that every weak consider

n £~(k)

sequential

convergent

Theorem.

E very weak

Proof.

process

I n 6~

A £ F

and choose

, define a stopping

i T

n

(~)

time

sequential

k 6~ r

n

£ T

n

,

if

~ £A

k

,

if

~ 6 ~A

amart

such that

is a weak

A £ Fk

. For all

by letting

:=

Then we have

~n(A)

:

~T

(~) - ~k ( ~ A ) n

for all

n £~(k)

Since the sequence

{ rn6T

I n6~(k)

amart.

}

~is

164

increasing,

it follows that the sequence

{ ~n (A)

I n 6~

}

is w e a k l y

convergent,

m

This yields the weak sequential amart c o n v e r g e n c e theorem:

3.6.11. Suppose If

~

Corollary. ~

has the R a d o n - N i k o d y m p r o p e r t y and a separable dual.

is a T - b o u n d e d w e a k sequential amart, then

w - l i m Dn~ n

=

D

w - l i m ~n

a.e.

F r o m an example given by Brunel and S u c h e s t o n

[31] it can be seen that

the s e p a r a b i l i t y of the dual is a n e c e s s a r y c o n d i t i o n in the w e a k sequential amart c o n v e r g e n c e theorem.

In v i e w of these examples,

all a s s u m p t i o n s made in the u n i f o r m weak

amart c o n v e r g e n c e t h e o r e m are n e c e s s a r y c o n d i t i o n s and the c o n c l u s i o n c a n n o t be improved.

3.7.

R e m a r k s .

For v e c t o r m e a s u r e s of b o u n d e d variation,

it is also p o s s i b l e to prove a

Yosida-Hewitt decomposition. A vector measure be p u r e l y f i n i t e l y a d d i t i v e if its v a r i a t i o n additive.

~ £ bva(F,~) II ~ II

is said to

is purely f i n i t e l y

It is easy to see that a r e s u l t a n a l o g o u s to L e m m a 3.1.8 holds

for c o u n t a b l y a d d i t i v e v e c t o r m e a s u r e s and for purely finitely a d d i t i v e vector measures.

R e p l a c i n g ~ - c o n t i n u o u s and ~ - s i n g u l a r v e c t o r m e a s u r e s

by c o u n t a b l y a d d i t i v e and p u r e l y f i n i t e l y a d d i t i v e v e c t o r m e a s u r e s in T h e o r e m 3.1.9 yields the Y o s i d a - H e w i t t d e c o m p o s i t i o n ; slightly more general result,

see

for a proof of a

[49; T h e o r e m 1.5.8].

C h a t t e r j i ' s c o n v e r g e n c e t h e o r e m for v e c t o r - v a l u e d m a r t i n g a l e s e x t e n d e d to u n i f o r m amarts by B e l l o w processes;

see also

[10,12]. In

[34] was

[11] who also i n t r o d u c e d these

[37], C h a t t e r j i stated the c o n v e r g e n c e

theorems for the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s of m a r t i n g a l e s of measures

(Corollary 3.3.9)

and of u n i f o r m amarts of m e a s u r e s

(Corollary

3.5.13), thus a n t i c i p a t i n g the u n i f o r m a m a r t c o n v e r g e n c e theorem.

W e a k c o n v e r g e n c e theorems were proven by C h a c o n and S u c h e s t o n strong a m a r t s and by Brunel and S u c h e s t o n

[33] for

[29] for weak sequential amarts.

These results are slightly g e n e r a l i z e d by the u n i f o r m weak amart convergence theorem

(Corollary 3.6.8). Let us also remark that, by the

general optional sampling theorem,

every strong amart of r a n d o m v a r i a b l e s

is a weak sequential amart. For strong amarts of measures, however, we only have the optional

sampling theorem in the form of T h e o r e m 2.7.3 in

which the growth c o n d i t i o n be omitted.

r

E T(n) , for all n 6~ , apparently cannot n Therefore, we c a n n o t prove that every strong a m a r t of m e a s u r e s

is a w e a k sequential amart, and it was this o b s t a c l e w h i c h led us to i n t r o d u c e u n i f o r m w e a k amarts, w h i c h g e n e r a l i z e strong amarts as well as w e a k sequential amarts.

The R a d o n - N i k o d y m p r o p e r t y is e s s e n t i a l only for p r o v i n g the c o n v e r g e n c e t h e o r e m for u n i f o r m l y l - c o n t i n u o u s m a r t i n g a l e s

(Theorem 3.3.7);

see

[49]

for a d e t a i l e d d i s c u s s i o n of the R a d o n - N i k o d y m p r o p e r t y and m a r t i n g a l e convergence.

In the c o n v e r g e n c e theorems for m a r t i n g a l e s w i t h l - s i n g u l a r

limit m e a s u r e and for p o t e n t i a l s of any type, the R a d o n - N i k o d y m p r o p e r t y is only n e e d e d in the d e f i n i t i o n of the g e n e r a l i z e d R a d o n - N i k o d y m d e r i v a t i v e s and it can thus be omitted in the case where these set f u n c t i o n p r o c e s s e s are o b t a i n e d by i n t e g r a t i n g stochastic processes. For the role of the R a d o n - N i k o d y m p r o p e r t y of the dual and the

186

s e p a r a b i l i t y of the dual in the c o n t e x t of weak convergence, and J o h n s o n

[47], and Brunel and S u c h e s t o n

see Davis

[31].

A l t h o u g h strong amarts and u n i f o r m amarts are clearly d i s t i n g u i s h e d by their r e s p e c t i v e d i f f e r e n c e properties,

w h i c h do not involve the limit

m e a s u r e and w h i c h also show that the d i f f e r e n c e b e t w e e n strong amarts and u n i f o r m amarts p r e c i s e l y c o r r e s p o n d s to the d i f f e r e n c e b e t w e e n the s e m i v a r i a t i o n and the v a r i a t i o n of a v e c t o r measure,

the role of the

limit m e a s u r e and the Riesz d e c o m p o s i t i o n seems to be m o r e important, at least in the f r a m e w o r k of set f u n c t i o n processes. The d i f f e r e n t types of c o n v e r g e n c e to the limit m e a s u r e and the d i f f e r e n t types of p o t e n t i a l s r e s u l t i n g from the r e s p e c t i v e Riesz d e c o m p o s i t i o n s e x p l a i n in w h i c h way u n i f o r m amarts,

strong amarts, and u n i f o r m weak amarts a s y m p t o t i c a l l y

a p p r o a c h martingales.

For strong amarts,

the role of the Riesz

d e c o m p o s i t i o n was e m p h a s i z e d by E d g a r and S u c h e s t o n as p o i n t e d out by B e l l o w

[11,12],

it m o t i v a t e d

[58,59]. Moreover,

"to a large degree" the

n o t i o n of a u n i f o r m amart, and we can also say this for the n o t i o n of a u n i f o r m w e a k amart.

The d i s t i n c t i o n b e t w e e n u n i f o r m amarts,

strong amarts,

and u n i f o r m weak

amarts by d i f f e r e n t types of c o n v e r g e n c e to the limit m e a s u r e suggests g e n e r a l i z i n g the n o t i o n of a set f u n c t i o n process and to study also a d a p t e d sequences of b o u n d e d v e c t o r m e a s u r e s or even a d a p t e d sequences of v e c t o r m e a s u r e s having b o u n d e d scalar variations. of course,

These correspond,

to stochastic p r o c e s s e s of Pettis i n t e g r a b l e or s c a l a r l y

i n t e g r a b l e random variables. V e c t o r - v a l u e d amarts of Pettis integrable r a n d o m v a r i a b l e s w e r e studied by Bru and H e i n i c h Sucheston Uhl

[29,30,31], E d g a r and S u c h e s t o n

[25,27,28], B r u n e l and

[58,59,60], and G h o u s s o u b

[71];

[129] studied the Pettis m e a n c o n v e r g e n c e of v e c t o r - v a l u e d amarts.

In most c o n v e r g e n c e theorems, however,

Pettis i n t e g r a b l e r a n d o m v a r i a b l e s

are forced to be B o c h n e r integrable by the c o n d i t i o n of T - b o u n d e d n e s s .

The p r o p e r t i e s of v e c t o r - v a l u e d amarts are closely c o n n e c t e d w i t h the p r o p e r t i e s of B a n a c h spaces or, more generally,

those of b o u n d e d linear

o p e r a t o r s b e t w e e n B a n a c h spaces. C h a r a c t e r i z a t i o n s of finite dimensional, reflexive, Bellow Egghe

and w e a k l y s e q u e n t i a l l y c o m p l e t e B a n a c h spaces were g i v e n by

[7], Brunel and S u c h e s t o n [66]. Brunel and S u c h e s t o n

[29,30], Edgar and S u c h e s t o n

[60], and

[31] also gave a c h a r a c t e r i z a t i o n of

the s e p a r a b i l i t y of the dual. The c h a r a c t e r i z a t i o n of a b s o l u t e l y summing o p e r a t o r s in terms of strong amarts is due to G h o u s s o u b Edgar

[73]. Moreover,

[55] gave a c h a r a c t e r i z a t i o n of A s p l u n d o p e r a t o r s in terms of weak

sequential amarts.

4.

Amar

ts

in

a

Banach

lattice

.

The theory of amarts in a B a n a c h lattice is p a r t i c u l a r l y rich. Due to the e x i s t e n c e of a partial ordering,

the notions of s u b m a r t i n g a l e s and

s u p e r m a r t i n g a l e s make sense but, d e v i a t i n g from the real case, p o s i t i v e s u b m a r t i n g a l e s and p o s i t i v e s u p e r m a r t i n g a l e s possess quite d i f f e r e n t properties.

This d i f f e r e n c e is e s s e n t i a l l y the same as the d i f f e r e n c e

e x i s t i n g b e t w e e n u n i f o r m amarts and strong amarts.

The a p p r o p r i a t e g e n e r a l i z a t i o n of s u b m a r t i n g a l e s and s u p e r m a r t i n g a l e s is given by the notion of order amarts w h i c h are d e f i n e d in terms of order convergence. Although,

in an order c o n t i n u o u s B a n a c h lattice,

every o r d e r amart is a strong amart, order amarts have the a d v a n t a g e of forming a v e c t o r lattice, and the same is true for order potentials. By the Riesz d e c o m p o s i t i o n for order amarts and the lattice p r o p e r t y of order potentials,

the c o n v e r g e n c e p r o b l e m for T - b o u n d e d order amarts

reduces to the c o n v e r g e n c e p r o b l e m for T - b o u n d e d p o s i t i v e order potentials.

These are, in particular,

p o s i t i v e u n i f o r m weak potentials,

for which weak c o n v e r g e n c e obtains u n d e r less r e s t r i c t i v e c o n d i t i o n s on the dual than this is the case for general u n i f o r m w e a k potentials. Consequently,

the order amart c o n v e r g e n c e t h e o r e m is v a l i d in a larger

class of B a n a c h lattices than the strong amart c o n v e r g e n c e t h e o r e m is.

A n o t h e r interesting point is that, for p o s i t i v e set function processes, cone a b s o l u t e l y summing o p e r a t o r s and A L - s p a c e s play the same role as a b s o l u t e l y summing o p e r a t o r s and finite d i m e n s i o n a l B a n a c h spaces do for general set f u n c t i o n processes.

This will b e c o m e clear from various

c h a r a c t e r i z a t i o n s of cone a b s o l u t e l y summing o p e r a t o r s and A L - s p a c e s in terms of set function processes.

168

The i n v e s t i g a t i o n of amarts in a B a n a c h lattice r e q u i r e s some a d d i t i o n a l i n f o r m a t i o n on v e c t o r m e a s u r e s w h i c h e s s e n t i a l l y c o n c e r n s the e x i s t e n c e of a J o r d a n d e c o m p o s i t i o n for v e c t o r m e a s u r e s of b o u n d e d variation. We shall thus start again with vector m e a s u r e s

(Section 4.1). A f t e r a brief

d i s c u s s i o n of general set f u n c t i o n p r o c e s s e s and p o s i t i v e semiamarts (Section 4.2), we shall study s u b m a r t i n g a l e s amarts and p o s i t i v e strong p o t e n t i a l s p o s i t i v e weak p o t e n t i a l s

(Section 4.3), u n i f o r m

(Section 4.4), w e a k amarts and

(Section 4.5), and order amarts

(Section 4.6).

Again, we shall c o n c l u d e this chapter w i t h some remarks and c o m p l e m e n t s (Section 4.7).

T h r o u g h o u t this chapter, ordering

<

and n o r m

let

~

be a (real) Banach lattice w i t h partial

II. II . For some d e f i n i t i o n s and p r o p e r t i e s of

specific Banach lattices, we refer to the a p p e n d i x on Banach lattices at the end of these notes. F u r t h e r details may be found in the books by Schaefer

[109] and by L i n d e n s t r a u s s and Tzafriri

[91].

4.1.

This

V e c t o r

section

relation

is c o n c e r n e d

to vector

tool will

m e a s u r e s

with

measures

.

order bounded

of b o u n d e d

again be the representation

vector

variation. of v e c t o r

measures

and their

The principal

measures

technical

by linear

operators.

Let

F

be an algebra

A set function

~

~(A)

holds

in

denote Endowed

. Clearly, bounded

the class with

4.1.1.

.

is p o s i t i v e

if

it is o r d e r

bounded

if

l~(A) I

order

and order,

Suppose

~

> ~

A 6 F , and

supF

and every

: F

~

6 ]E +

for all

exists

on a set

every

positive

vector

of a l l o r d e r b o u n d e d

the pointwise

the class

vector

measure

defined

oba(F, ~)

measure

is b o u n d e d . vector

addition,

is o r d e r b o u n d e d ,

Let

measures

oba(F, ~) in

a(F, ~ )

multiplication

is a n o r d e r e d

vector

.

by scalars,

space.

Lemma. ~

is o r d e r

Then the class

complete.

oba(F, ~)

is a v e c t o r

lattice,

(~v~)(A)

=

s u p F (A)

(~(B) + ~ ( A ~ B ) )

(~^~)(A)

=

inf F (A)

(~(B) + ~ ( A ~ B ) )

and the

identities

and

hold

for all

i is a l a t t i c e

The proof

>

norm

of t h i s

lattice

order bounded

A £ F o Moreover,

the map

II l~i (n) II on

oba(F, ~)

lemma

It can also be proven Banach

and

~, ~ £ o b a ( F , ~ )

is t h e

by direct

for the norm vector

s a m e a s in t h e r e a l c a s e

measures

methods

II l.t(~) II

that the class if

are bounded,

~

is o r d e r

(Lemma

2.1.1).

oba(F, ~) complete.

they can be represented

is a Since by

170

b o u n d e d linear o p e r a t o r s on the s u p - n o r m c o m p l e t i o n of the class of all simple functions,

and we shall use this a p p r o a c h for proving further

results on order b o u n d e d vector measures.

In order to c h a r a c t e r i z e order b o u n d e d v e c t o r m e a s u r e s in terms of their r e p r e s e n t i n g linear operators,

let us recall the f o l l o w i n g definition:

If

is a B a n a c h lattice and

~

then a b o u n d e d linear o p e r a t o r

~

~

order b o u n d e d sets in operator

~

S 6 ~ ( ~ , ~)

is an order c o m p l e t e B a n a c h lattice, • R

is regular if it maps the

into the order b o u n d e d sets in

~

iSi

is regular if and only if its m o d u l u s

exists in the o r d e r e d v e c t o r space of all linear o p e r a t o r s For a regular o p e r a t o r bounded,

. A linear

S 6 ~ ( ~ , ~)

, the m o d u l u s

ISi

~

> ~

.

is a u t o m a t i c a l l y

and we define

II s I1

:=

r

11 Isl

11

Then the map

S

I

>

II s IIr

is a n o r m on the class

~ r ( ~ , ~)

of all regular o p e r a t o r s

~

• R

,

w h i c h is an order c o m p l e t e B a n a c h lattice for this norm. For details, see

[109; Section IV.l].

4.1.2.

Theorem.

Suppose

~

is order complete.

Then the class norm

oba(F, ~)

il i.l(~) II , and the map

i s o m o r p h i s m of

oba(F, ~)

III~ III(~) holds for all

Proof.

is an o r d e r c o m p l e t e B a n a c h lattice for the

<

onto

X

is an isometric v e c t o r lattice

~ r ( D , ~)

III I~I lll(s)

=

. Moreover,

II l~l(s)

the r e l a t i o n

II

~ 6 oba(F, ~)

In order to p r o v e the theorem,

a vector measure

~£ba(F,

~)

it is s u f f i c i e n t to c o n s i d e r

and its r e p r e s e n t i n g linear o p e r a t o r

T E ~ ( D , ~) Suppose first that

~

is order bounded.

for each simple f u n c t i o n

iT( Z ~ i X A i ) I

Consider

Z ~iXAi E [-XA,X A]

=

I Z ~ i ~ ( A i) i

~

A £ F . Then we have,

,

Z

l~il I~(A i) i

~

I~I (A)

.

171

S i n c e the o r d e r

[- I~I (A) , I~I (A) ]

interval

is c l o s e d a n d

T

is b o u n d e d ,

this y i e l d s <

ITxl

for all

1~1 (A)

x £ [-XA,X A]

,

. Since each order bounded

in some m u l t i p l e

of the o r d e r i n t e r v a l

above

that

inequality

T

is r e g u l a r .

set in

[-X~,XQ] Therefore,

]9

is c o n t a i n e d

, it f o l l o w s ITJ

exists

f r o m the a n d we

have

ITIx A for all

<

A£ F . Moreover,

II lu,l(n) II

II iTi II

=

suP[0,Xn]

if

for all

order bounded,

T

is r e g u l a r ,

=

ITXBI

A £ F

and

~

II iT1x II

=

tl ITIX~ II

then

ITIX A

B 6 F(A)

. This relation

implies

that

~

is

of

I~I

,

a n d it a l s o y i e l d s

i~i(A)

~

ITIx A

,

A6 F , hence

II I~I(~) II Thus,

,

of

~(B) I

for all

we have

<

Conversely,

holds

,

II

II ITI

because

11~I (A)

<

II ITI II

we h a v e

I~I which means

=

that

ITI o X

ITI

,

is the r e p r e s e n t i n g

a n d we a l s o h a v e

It l ~ l ( n )

II

=

II ITI

I~

=

~I T II r

linear operator

172

This proves the a s s e r t i o n c o n v e r n i n g

oba(F, ~)

and

X . Finally, we

have

III ~ III(n)

=

II T II

<

II ITI

II

=

III I~I III (n)

,

by T h e o r e m 3.1.1.

The n e x t result i l l u s t r a t e s that, m o d u l o a mild c o n d i t i o n on the B a n a c h lattice, the o r d e r b o u n d e d v e c t o r m e a s u r e s form an i n t e r m e d i a t e c o n c e p t b e t w e e n the v e c t o r m e a s u r e s of b o u n d e d v a r i a t i o n and the b o u n d e d v e c t o r measures. 4.1.3.

Theorem.

Suppose

~

has p r o p e r t y

Then the class norm

H.

bva(F, ~)

is an order c o m p l e t e Banach lattice for the

If(Q) , and the map

i s o m o r p h i s m of an ideal in

bva(F, ~)

oba(F, ~)

II I~I(Q) II holds for all

Proof.

(P).

<

~

~)

. Moreover,

bva(F, ~)

~)

(P), the class

~I(D,

~)

tl. 111 , and it also is an ideal in

by

[109; T h e o r e m IV.4.3]. NOW the a s s e r t i o n c o n c e r n i n g

X

follows from T h e o r e m 3.1.2 and T h e o r e m 4.1.2. Moreover, £ b v a ( F , ~)

is a B a n a c h ~ r ( D , ~)

bva(F, ~)

=

III I~I lll(s)

by T h e o r e m 4.1.2 and since

II. ll(~)

<

II I~I ll(n)

=

II ~ll(S)

,

is a lattice norm.

Corollary.

The f o l l o w i n g are equivalent: (a)

~

(b)

bva(F, ~)

Moreover,

if

and

is an AL-space.

oba(F, ~)

Proof. IV.4.5].

~

is an AL-space.

is an AL-space,

then the B a n a c h lattices

bva (F, ]E)

are identical.

Note that

D

is an A M - s p a c e and apply

[109; P r o p o s i t i o n

,

and

for all

, we have

II l~l(s) II

4.1.4.

is

II u, ll(n)

has p r o p e r t y

lattice for the n o r m

is an isometric v e c t o r lattice ~I(D,

, and the i n e q u a l i t y

~£bva(F,

Since

X

onto

173 We shall now c h a r a c t e r i z e cone a b s o l u t e l y summing o p e r a t o r s and,

in

particular, A L - s p a c e s in terms of p o s i t i v e vector m e a s u r e s and in terms of order b o u n d e d v e c t o r measures.

These results are c o u n t e r p a r t s of the

c h a r a c t e r i z a t i o n of a b s o l u t e l y summing operators and finite d i m e n s i o n a l Banach spaces given in Section 3.1.

4.1.5.

Theorem.

Suppose

~

is a B a n a c h lattice,

~

is a B a n a c h space, and

S :

>14

is a b o u n d e d linear operator. Then the f o l l o w i n g are equivalent: (a) S is cone a b s o l u t e l y summing. (b)

There exists a c o n s t a n t [I S~ {l (Q) < O I I ~(~) II

p £]R+

each p o s i t i v e v e c t o r m e a s u r e

(c)

vector m e a s u r e if

holds with

Proof.

S

~6a(F,

Suppose first that

S

T 6 ~ ( D , ~)

~ E is bounded).

(note that

cone a b s o l u t e l y summing, we have,

hence

S 0T

and its r e p r e s e n t i n g linear o p e r a t o r Since

II s II1

II z Tx i II

<_

II s II1

II T II II Z x i II

_<

II s II1

II T II

S

,

Since

,

S 0 T

is the r e p r e s e n t i n g linear

S~ , the above i n e q u a l i t y y i e l d s

<_

II s II1

III~ III(~)

by T h e o r e m 3.1.2, T h e o r e m 3.1.1, and since (a) implies

(b) implies

4.1.6 that

is p o s i t i v e and

is cone a b s o l u t e l y summing and satisfies the inequality

II S ~ l l ( n )

Clearly,

T

for each finite c o l l e c t i o n

_<

[109; P r o p o s i t i o n IV.3.3].

Therefore,

then the inequality in (b)

,

II S T x i II

II S 0 T II1

o p e r a t o r of

and for each p o s i t i v e

is cone a b s o l u t e l y summing. C o n s i d e r a

~ 6 a(F, ~)

z

F

.

positive v e c t o r measure

{Xl,X 2 .... ,Xk} c D +

and for

~)

is cone a b s o l u t e l y summing,

O = II s II l

F

~ £ a (F, ~)

S~ E bva(F, IF:.) holds for each algebra

Moreover,

by

such that

holds for each a l g e b r a

=

II s II1

~

II ~ ( n )

II

,

is positive.

(b).

(c), and it follows from the s u b s e q u e n t Example

(c) implies

(a).

is

174

4.1.6. Suppose

Example. ~

is a B a n a c h lattice,

~

is a B a n a c h space, and

S :~

>

is a b o u n d e d linear o p e r a t o r w h i c h is not cone a b s o l u t e l y summing. Then there exists a summable sequence sequence

{ Sx n

i n 6~

}

C o n s i d e r the algebra ,

I n 6~

}

such that the

is not a b s o l u t e l y summable.

F

Bn, 2 := [2-n,2 -n+1)

{ xn E~+

on

[0,1)

n£~

w h i c h is g e n e r a t e d by the sets

, and define a vector m e a s u r e

~ 6 a(F, ~)

by letting

~(Bn, 2) for all

n 6~

measure

SB

4.1.7.

:=

xn

. Then

~

, is positive,

hence bounded, but the v e c t o r

does not have b o u n d e d variation.

Corollary.

The f o l l o w i n g are equivalent: (a)

~

is isomorphic

(as a topological v e c t o r lattice)

to an

AL-space.

II ~(~)

(b)

II = H ~ ll(~)

holds for each a l g e b r a

positive vector measure (c)

~Ebva(P,

~)

vector measure

Proof.

holds for each algebra

i~

P

and for each p o s i t i v e

[109; T h e o r e m IV.2.7],

(as a t o p o l o g i c a l v e c t o r lattice)

if the identity map

and for each

~ 6 a(F, ~)

By S c h l o t t e r b e c k ' s t h e o r e m

isomorphic

F

~ E a(F, ~)

~

is

to an A L - s p a c e if and only

is cone a b s o l u t e l y summing, and in this case

we have

1

:

lli%ll

--

Ill%If

I

N o w the a s s e r t i o n follows from T h e o r e m 4.1.5.

4.1.8. Suppose

Corollary. ~

is an AL-space.

Then the identity

III~ lll(n)

=

II~(Q) II

--

II ~ ll(n)

holds for each p o s i t i v e v e c t o r m e a s u r e Proof.

~ 6 a(P, ~)

The first identity follows from T h e o r e m 4.1.2 and the second

one is given in C o r o l l a r y 4.1.7.

m

175

The f o l l o w i n g results are v a r i a n t s of T h e o r e m 4.1.5 and C o r o l l a r y 4.1.7, with order b o u n d e d v e c t o r m e a s u r e s in the place of p o s i t i v e v e c t o r measures:

4.1.9.

Theorem.

Suppose and

~

is an o r d e r c o m p l e t e B a n a c h lattice,

S :~

> ~

~

is a B a n a c h space,

is a b o u n d e d linear operator. T h e n the f o l l o w i n g are

equivalent: (a)

S

is cone a b s o l u t e l y summing.

(b)

There exists a c o n s t a n t

p E~+

i[ S~ II(~) < p II [~I(~) [[

such that

holds for each a l g e b r a

F

and for

m

each vector measure (c)

S~ £ bva(F, ~) measure

Moreover,

if

holds with Proof.

S

F

and for each v e c t o r

is cone a b s o l u t e l y summing, then the inequality in (b)

p = II S II1 .

f' 6 ~

satisfying

II Sx II

holds for all have,

~)

~ E oba(F, ~)

Suppose first that

exists

~£oba(F,

holds for each a l g e b r a

<

x £~

is cone a b s o l u t e l y summing. Then there II S II1

and such that

f' (Ixl)

. Consider a vector measure

for e a c h p a r t i t i o n

z

S

Jl f' II ~

II S~(A i) II

{AI,A 2 .... , % } 6 P(~)

<_

f' ( Z I~(A i) I)

<

f'(l~l(~))

_<

II s II1 II lul(n) II

w

~ £ oba(F, ~)

. Then we

,

This yields

II s~ll(n) Therefore, Clearly, implies

Again,

<_

(a) implies

(b) implies

II s II1 II I~I(~) II (b).

(c), and it follows from E x a m p l e 4.1.6 that

(c)

(a).

the f o l l o w i n g c h a r a c t e r i z a t i o n of A L - s p a c e s

S c h l o t t e r b e c k ' s theorem:

is a c o n s e q u e n c e of

176

4.1.10. suppose (a)

Corollary. is order complete. is isomorphic

Then the f o l l o w i n g are equivalent:

(as a t o p o l o g i c a l vector lattice)

to an

AL-space. (b)

II I~I(Q) II = II ~ II(~) vector measure

(c)

bva(F, ~)

holds for each algebra

F

and for each

~ E oba(F, ~)

= oba(F, ~)

holds for each algebra

F .

4.2.

S e t

The main

purpose

cone absolutely function

Let

F

f u n c t i o n

of this summing

operators

and AL-spaces

in t e r m s

of positive

be a stochastic

~

basis

is a B a n a c h

is a b o u n d e d

linear

(a)

S

is c o n e

(b)

S

maps

on a set

in (c)

S

~

set

~

.

maps

Suppose

space,

following

are

and

S

:

equivalent:

summing. in

~

into the T-bounded

II S ~ T ll(~)

in

~

first

(on a n a r b i t r a r y set function

processes

that

~

Therefore,

(a)

implies

It f o l l o w s

from the

S

in

in

basis)

semiamarts

into

in

~

the T-bounded

(on a n set function

.

~

is f i n i t e ,

process

positive

stochastic

semiamart

set function

is a B a n a c h the

semiamarts

the N-bounded

processes

Proof.

absolutely

basis)

•

Then

.

arbitrary

a positive

lattice,

operator.

the positive

stochastic

~

is c o n e a b s o l u t e l y . Then

sup T

by Theorem

summing.

II ~ T ( ~ )

4.1.5,

hence

Consider

is f i n i t e ,

II

S~

hence

is a T - b o u n d e d

.

(b).

subsequent

Example

4.2.2

that

(c)

implies

(a).

o

Example.

4.2.2.

Suppose

~

is a B a n a c h

is a b o u n d e d there

sequence

linear

exists { Sx n

On the standard process

~

lattice,

operator

a summable

I n £~

}

stochastic

~

which

is a B a n a c h is n o t c o n e

sequence

basis

on

[0,1)

space,

and

absolutely

{ x n 6~+

is n o t a b s o l u t e l y

I n 6~

summable. , define

} Let

S

:F

n Z

xj

,

if

k = 1

such that the x

:= Z x n

a set function

Xn

,

if

k

0

,

otherwise

9=I ~ n (Bn ,k )

~

:=

is a p o s i t i v e

set function

process.

=

2

Moreover,

)

summing.

by letting

X--

Then

of

Theorem.

Suppose

Then

is t o g i v e a f i r s t c h a r a c t e r i z a t i o n

processes.

4.2.1.

sup T

section

p r o c e s s e s .

it c a n b e

seen

178 from Example 3.2.5 that function process constant

p 6~+

S~

~

is an P - b o u n d e d

is not T - b o u n d e d

s e m i a m a r t and that the set

(for the p r e s e n t example,

may be chosen to be equal to

the

II x II ).

For later reference, we also remark that the set function process is a strong potential, { ~T (~)

I T £ T }

by Example 3.2.5, and that the net

d e c r e a s e s to

0 , which means that

potential

(see Section 4.3 for the definition).

4.2.3.

Corollary.

~

is a Doob

The f o l l o w i n g are equivalent: (a)

~

is isomorphic

(as a t o p o l o g i c a l vector lattice)

to an

AL-space. (b)

Every p o s i t i v e semiamart is T-bounded.

(c)

Every P - b o u n d e d p o s i t i v e semiamart is T-bounded.

The f o l l o w i n g e l e m e n t a r y lemma can be proven as in the real case (Lemma 2.2.1):

4.2.4. Suppose If

~

Lemma. ~

has p r o p e r t y

(P).

is a set f u n c t i o n process and

r

is a b o u n d e d stopping time,

then the identity

i ~ T I (A) holds for all

=

Z I~pl (An{~=p}) p=l

A E F

The f o l l o w i n g result is obvious:

4.2.5. Suppose

Theorem. ~

has p r o p e r t y

(P).

Then the class of all T - b o u n d e d set f u n c t i o n p r o c e s s e s is a B a n a c h lattice for the n o r m

lJ. II T "

For the r e m a i n d e r of this chapter,

A. :

F=,

'>... [ 0 , 1 ]

be a fixed p r o b a b i l i t y measure.

let

4.3.

S U b

m a r t i n ~ a 1 e s .

S u b m a r t i n g a l e s c e r t a i n l y c o n s t i t u t e the m o s t important class of set function p r o c e s s e s w h i c h are defined in terms of the partial o r d e r i n g of the B a n a c h lattice.

P a r t i c u l a r l y i n t e r e s t i n g are, of course, p o s i t i v e

s u b m a r t i n g a l e s since they may arise as the modulus of a martingale. We shall see that p o s i t i v e s u b m a r t i n g a l e s have many p r o p e r t i e s w i t h u n i f o r m amarts. For n e g a t i v e submartingales, is quite different:

Usually,

however,

in common the situation

these p r o c e s s e s only share the p r o p e r t i e s

of strong amarts but not those of u n i f o r m amarts, e x c e p t for the case w h e r e the B a n a c h lattice is an AL-space.

A set f u n c t i o n p r o c e s s if the net

{ ~z(Q)

~

is a s u b m a r t i n ~ a l e

I ~ E T }

is increasing

is a Doob p o t e n t i a l if the net

{ ~T(~)

(resp. supermartin~ale)

(resp. decreasing),

I T £T }

The following c h a r a c t e r i z a t i o n of s u b m a r t i n g a l e s real case

(Theorem 2.4.1):

4.3.1.

Theorem.

For a set f u n c t i o n process (a)

~

d e c r e a s e s to

and it 0 .

is the same as in the

, the f o l l o w i n g are equivalent:

~

is a submartingale.

(b)

~

~ R ~O

holds for all

T £ T

and

o6T(T)

(c)

~n ~ RnBm

holds for all

n 6~

and

m £ ~ (n)

(d)

~n ~ Rn~n+1

holds for all

n E~

.

Let us first study p o s i t i v e submartingales.

4.3.2. If

~

II ~ II Proof.

Theorem. is a p o s i t i v e submartingale,

then the set function process

is a real submartingale.

For all

II ~T li(A)

as was to be shown.

T 6T

,

o C T(~)

and

A C F T , we have

=

suppT(A)

Z

II ~T(Ai)

II

<

SUppo(A)

Z

II ~o(Ai) II

=

II ~o il(A) D

180

4.3.3.

Corollary.

For a p o s i t i v e s u b m a r t i n g a l e (a)

~

is ~ - b o u n d e d .

(b)

~

is T-bounded.

Moreover,

if

~

~

is ~ - b o u n d e d ,

, the following are equivalent:

then

II ~ I~ = II ~ IIT

The next result is the Riesz d e c o m p o s i t i o n for ~ - b o u n d e d p o s i t i v e submartingales:

4.3.4. Suppose

Theorem. ~

is a KB-space.

Then every ~ - b o u n d e d p o s i t i v e s u b m a r t i n g a l e is the d i f f e r e n c e of an ~ - b o u n d e d

p o s i t i v e m a r t i n g a l e and a T - b o u n d e d Doob potential.

The d e c o m p o s i t i o n

Proof. all

is unique.

C o n s i d e r an ~ - b o u n d e d

A E F

, the sequence

increasing,

positive submartingale

{ ~n(A)

[ n 6~

hence c o n v e r g e n t since

~(A)

:=

exists for a l l

lim ~n(A)

A E F

~

:

su b

Therefore,

_~

:=

{ Rn~

~

for

Thus,

~n(A) 5 £ a(F,

it can be shown that

g e n e r a t e s an ~ - b o u n d e d

I n ql~ }

. Then,

is n o r m b o u n d e d and

is a KB-space.

and defines a v e c t o r m e a s u r e

As in the proof of T h e o r e m 3.4.4, variation.

}

~

~

~)

has b o u n d e d

positive martingale

,

and it is then clear that the set function process

_~

::

_~-_~

is a Doob p o t e n t i a l w h i c h is T - b o u n d e d since

~

and

~

are T-bounded,

by C o r o l l a r y 4.3.3.

[]

The Riesz d e c o m p o s i t i o n will be used in the proof of the strong c o n v e r g e n c e t h e o r e m for ~ - b o u n d e d

p o s i t i v e submartingales,

we shall

also need the following result on B a n a c h lattices:

4.3.5.

Lemma.

Suppose

~

If, for

u 6~+

to

has the R a d o n - N i k o d y m property. , the sequence

{ u n £ [0,u]

u , then it c o n v e r g e s strongly to

u

I n6~

}

converges weakly

181

Proof.

Consider

0

<

z £ [0,u]

u - u vz

--

for

all

n 6~

and

we also

all

z

=

<

u

z - Un^Z

n E~

, which

,

I n 6~

u ^z n

} c

=

(UnVZ-U)

+

( u - u n)

point

[0,u]

,

yields

=

is a s t r o n g l y

{ UnAZ

n

yields

u vz n

w-lim

If

u - u

--

, which

we have

have

0

for

<

n

w-lim

. Then

z

exposed

[0,u]

converges

of

strongly

, then to

z

the

sequence

, which

yields

+ lim

If

z

Zl,

z2,

( z - u n)

is a c o n v e x ...,

=

(Z-UnAZ)

combination

z k 6 [0,u]

~i(zi-

lim

, then

u n)

=

Z ~izi we

of

0

strongly

exposed

points

have

u n)

~

X ~i(zi-

<

Z ~ i ( z i - Un)

and + 0

,

hence

_

0

for

all

<

n £~

=

(Z-Un)+

, which

( Z~i(zi-u

n)

)+

<

Z ~i(zi-Un)

+

,

yields +

lim

By Phelps' the from

theorem

closed the

(z - Un)

convex

[49; hull

=

0

Theorem of

its

VII.3.3], strongly

the

order

exposed

points.

inequality + 0

<__

u-

un

<_

(u-z)

+

(z-u

n)

interval

,

Now

[0,u] it follows

is

182

for all to

u

n E]q , t h a t

sequence

{ un

I n E]q }

converges

strongly

.

o

We can now prove

4.3.6.

the p o s i t i v e

submartin~ale

convergence

theorem:

Theorem.

Suppose If

the

_~

IE

has

the

Radon-Nikodym

is an ]q-bounded

lim Dn~ n Proof.

positive

=

D

By the R i e s z

measure

~

and

l i m ~n

:=

{ Rn~

Y

:=

D~

then

a.e.

decomposition,

increases

_~

property. submartingale,

the

to the ] q - b o u n d e d

submartingale positive

_~

has

a limit

martingale

I n E]q }

Define

and,

for all

n q]q ,

Xn

:=

DnB n

Yn

:=

Dn~n

and

By the martingale

lim Y

Since

convergence

=

n

Y

the m a r t i n g a l e

theorem

(Corollary

3.3.9),

we have

a.e.

~

majorizes

the p o s i t i v e

submartingale

have

0

<

X

--

< n

Y

--

a.e., n

hence

0

<

X

--

for all

vY

- Y

n

n E]q , w h i c h

lim X

n

vY

<

Y

--

yields

=

Y

a.e.

VY n

- YvY

< --

IY

-YJ n

a.e.,

~

, we

183

In o r d e r

to prove

lim X

by the vector n £~

AY

n

X

by Lemma

4.3.5.

In order

to prove

Y

=

lattice

, it is e v e n

w-lim

to

lim X

= Y

n Y

identity.

AY

--

that

the

is a b o u n d e d

real

e' E ~ '

set function

limit measure Theorem

Since

n

^ Y £ [0,Y]

{ Xn ^ Y

for

e' £ ~

submartingale

e'5

X

sequence that,

for

with

to prove

a.e.

holds

for all

a.e.,

e'~

with

sufficient

to prove

Y

, let us first note

, the

it is t h u s

a.e.,

sufficient

n

a.e.,

with

process

I n 6~ , the

converges

limit measure

e'~

, and the amart

}

set function e'~

is a b o u n d e d

convergence

. Hence,

real

theorem

weakly

process

amart

yields,

3.1.11,

lim e'Dn~ n

=

lim Dne'~ n

=

D e'~

=

e'D ~

a.e.,

hence

lim e'X

and

n

=

e'Y

therefore

lim e'(X n AY)

Next, has

a.e.,

for almost

all

hence

convergent

lim e'(X n +Y-X

~ £ fl , w e h a v e

the Radon-Nikodym

compact,

=

weakly

subsequence

property,

=

e'Y

(X n ^ Y) (to) £ [0,Y(to)]

the order

sequentially

n v Y)

interval

compact,

. Since

[0,Y(to)]

and we may

{ (Xnk ^ Y) (to) I k 6 ~

a.e.

select

} , depending

on

is w e a k l y a weakly to .

Define

X(to)

:=

w-lim

Then we have,

for all

depending

e'

on

(Xnk ^ Y) (to)

e' E ~ '

and

toEfl

for all

outside

,

e' (X(t0))

=

lira e' ((Xnk ^ Y ) (to))

=

lime'

((X n ^ Y ) (~))

=

e' (Y(to))

a null

set

184

Therefore, n E~

X

is w e a k l y m e a s u r a b l e .

, are a l m o s t

separable.

Then

X

separably X

=

valued,

Y

every weak c l u s t e r a.e.,

sequence.

result

the o r d e r

interval

seque n c e

{ Xn ^ Y

cluster

hence

point

I n 6~

Y

Doob p o t e n t i a l

submartingale

Doob potentials,

4.3.7. Suppose

property,

is w e a k l y }

is

{ Xn ^ Y

LI(L,JI,

and,

~)

and it f o l l o w s

convergent

I n 6~

p o i n t of this

is o r d e r c o n t i n u o u s

. Thus,

t h a t the

to its u n i q u e weak a

submartingales.

We have p o i n t e d

in the Riesz d e c o m p o s i t i o n is T-bounded.

This

out that the

of an ~ - b o u n d e d

is not the case

as c a n be seen f r o m the f o l l o w i n g summing

operators

and AL-spaces:

lattice,

~

for a r b i t r a r y

characterization

of

Theorem. ~

is a B a n a c h

linear operator.

S

is cone a b s o l u t e l y

(b)

S

maps

S

maps

(d)

S

maps

Proof.

Suppose

the p o s i t i v e

r £ T

that

, hence

(c) implies

By E x a m p l e

4.2.2,

subsequent

Example

~

<

martingales in

S in

in

~

~

in

S :F

into the

in

in

4.3.8 that

into

~

into the ~ - b o u n d e d

.

. Then we have,

<

summing.

Consider

by T h e o r e m

4.1.5,

II s II 1 I l U l (Q) II

is T-bounded.

(b) and

•

in

(c).

(b) implies

>

.

is cone a b s o l u t e l y ~

~

supermartingales

processes

II s 111 II ~T (n) II S~

(a) implies

positive

processes

first

II s ~ x I I ( n )

Therefore,

processes

set f u n c t i o n

supermartingale

and

are equivalent:

Doob p o t e n t i a l s

set f u n c t i o n

set f u n c t i o n

space,

summing.

the ( ~ - b o u n d e d )

the T - b o u n d e d

is a B a n a c h

Then the f o l l o w i n g

the ( ~ - b o u n d e d )

T-bounded (c)

Clearly,

~

compact,

is w e a k l y

(a)

for all

p o i n t of the s e q u e n c e

is the u n i q u e weak c l u s t e r

is a b o u n d e d

positive

~

, as was to be shown,

occuring

cone a b s o l u t e l y

that

,

and we h a v e

[136], the same is true for

[0,Y]

Let us now study g e n e r a l

positive

Y

By the R a d o n - N i k o d y m

by C a r t w r i g h t ' s

we may and do a s s u m e

Xn A Y

a.e.

is equal

Y

the r a n d o m v a r i a b l e s

is s t r o n g l y m e a s u r a b l e ,

More generally, to

Since

(d). (a), and it can be seen from the (d) implies

(a).

,

a

}

185

4.3.8.

Example.

Suppose

~

is a B a n a c h

is a b o u n d e d Then

there

exists

sequence On the

linear

{ Sx n

_~

}

sequence

stochastic

basis

n Z

:=

is a p o s i t i v e n Z j=1

]I Sx. l] 3

The

the

and

I n 6~

summable. , define

S

:~

}

such

Let

x

t h a t the

:= Z x n

a set f u n c t i o n

n Z

<

,

if

k = 1

,

if

k 6 {2 j-1 + I ..... 29 }

3

Xn+l_ j

For

all

n 61~ , we h a v e n

--j=l

2J-I11 21-J

Xn+l_j

H

+

II x - Z

xj II 9=1

S ~ n II (0)

II

set f u n c t i o n

process

S~

~

is n o t ~ - b o u n d e d .

are e q u i v a l e n t : is i s o m o r p h i c

(as a t o p o l o g i c a l

vector

to an

lattice)

AL-space. (b)

Every (~-bounded)

Doob

(c)

Every (~-bounded)

positive

(d)

Every

It s h o u l d

be n o t e d

positive

that

potential

martingale

even

is T - b o u n d e d .

supermartingale

is T - b o u n d e d .

is ~ - b o u n d e d .

in an A L - s p a c e

a positive

submartingale

n e e d n o t be H - b o u n d e d .

For

a wide

class

of B a n a c h

lattices,

every

Doob

potential

is a s t r o n g

potential:

4.3.10. The

Theorem.

following

are equivalent:

(a)

~

is o r d e r

(b)

~

is c o u n t a b l y

is a s t r o n g

Proof.

Suppose

countably

order

continuous. order

complete

and every

Doob

potential

potential.

first

that

complete.

If

~

is o r d e r

~

is a D o o b

continuous. potential,

>

summing.

Corollary.

following

(a)

x.

martingale.

=

4.3.9.

{ x n £F+

[0,1)

9=i 21-j

Therefore,

on

space,

absolutely

by l e t t i n g

%in (Bn, k)

_~

is a B a n a c h is n o t c o n e

is n o t a b s o l u t e l y

x -

Then

~

which

a summable I n 6~

standard

process

lattice,

operator

Then

~

is

then we have

186

lim

III UT III(~)

=

by T h e o r e m 4.1.2 and since Conversely,

lira II ~T(n) II

~

=

0

,

is order continuous.

if every Doob p o t e n t i a l is a strong potential,

then this is

in p a r t i c u l a r true for Doob p o t e n t i a l s on the trivial stochastic basis, hence

~

is c o u n t a b l y order continuous.

order complete,

it follows that

~

~

is a l s o c o u n t a b l y

is order continuous.

We shall see that even an ~ - b o u n d e d potential.

Since

Q

Doob potential need not be a u n i f o r m

This will be made precise by another c h a r a c t e r i z a t i o n of cone

a b s o l u t e l y summing o p e r a t o r s and AL-spaces.

Let us first prove the Riesz

d e c o m p o s i t i o n for H - b o u n d e d n e g a t i v e submartingales:

4.3.11. Suppose

Theorem. ~

is order continuous.

Then every ~ - b o u n d e d n e g a t i v e s u b m a r t i n g a l e is the d i f f e r e n c e of an H - b o u n d e d m a r t i n g a l e and an ~ - b o u n d e d

Doob potential.

The d e c o m p o s i t i o n is unique. If the n e g a t i v e s u b m a r t i n g a l e is T-bounded,

Proof. all

then so is the Doob potential.

C o n s i d e r an Y - b o u n d e d n e g a t i v e s u b m a r t i n g a l e

A 6 F , the sequence

~(A) exists since

:= ~

su~

{ ~n (A)

}In (A)

_<

I n E~

}

~ . Then,

is m a j o r i z e d by

for

0 , hence

0

is order complete, and we have

~(A)

=

lim ~n(A)

,

by the s u b m a r t i n g a l e p r o p e r t y and since is a v e c t o r m e a s u r e in

a(F

, ~)

~

is order continuous. Hence

. The r e m a i n d e r of the proof is the

same as in the proof of T h e o r e m 4.3.4.

o

Let us remark that, d i f f e r e n t l y from the case of an ~ - b o u n d e d p o s i t i v e submartingale,

the Doob p o t e n t i a l o c c u r i n g in the Riesz d e c o m p o s i t i o n

of an ~ - b o u n d e d n e g a t i v e s u b m a r t i n g a l e n e e d not be T-bounded, by C o r o l l a r y 4.3.9.

4.3.12. Suppose

Corollary. ~

is order continuous.

Then every ~ - b o u n d e d n e g a t i v e s u b m a r t i n g a l e p o s i t i v e supermartingale)

is a strong amart.

(and thus: every ~ - b o u n d e d

187 The f o l l o w i n g c h a r a c t e r i z a t i o n of cone a b s o l u t e l y summing o p e r a t o r s and A L - s p a c e s is similar to T h e o r e m 4.3.7 and C o r o l l a r y 4.3.9:

4.3.13. Suppose and

Theorem. ~

is an order c o n t i n u o u s B a n a c h lattice,

S : ~ ---~

~

is a B a n a c h space,

is a b o u n d e d linear operator. T h e n the f o l l o w i n g are

equivalent: (a)

S

is cone a b s o l u t e l y summing.

(b)

S

maps the (~-bounded)

p o t e n t i a l s in (c)

S

~

in

~

(a) implies

an ~ - b o u n d e d

S

in

~

is cone a b s o l u t e l y summing.

If

into the

~

is

II S H 1 lim II ~T(~) II ~

=

0

,

is order continuous.

(b).

By the Riesz d e c o m p o s i t i o n , if

positive supermartingales .

S

<

by T h e o r e m 4.1.9 and since Therefore,

into the u n i f o r m

, then we have

II S~ T If(Q)

lim

Finally,

~

Suppose first that

a Doob p o t e n t i a l

~

.

maps the ~ - b o u n d e d

u n i f o r m amarts in

Proof.

Doob p o t e n t i a l s in

(b) implies

(c).

is not cone a b s o l u t e l y summing,

positive supermartingale

T-bounded, by T h e o r e m 4.3.7, h e n c e

S~

~

in

then there exists

~

such that

S~

is not

fails to be a u n i f o r m amart, by

C o r o l l a r y 3.5.4.

4.3.14.

o

Corollary.

The f o l l o w i n g are equivalent: (a)

~

is isomorphic

(as a t o p o l o g i c a l v e c t o r lattice)

to an

AL-space. (b)

E v e r y (~-bounded)

(c)

Every ~ - b o u n d e d

Proof.

Since every A L - s p a c e is order continuous,

(c), by T h e o r e m 4.3.13.

Doob p o t e n t i a l

is a u n i f o r m potential.

positive supermartingale

is a u n i f o r m amart.

(a) implies

(b) and

The c o n v e r s e i m p l i c a t i o n s f o l l o w from C o r o l l a r y

4.3.9, as in the proof of T h e o r e m 4.3.13.

The Riesz d e c o m p o s i t i o n for ~ - b o u n d e d g e n e r a l i z e d to those ~ - b o u n d e d

o

n e g a t i v e s u b m a r t i n g a l e s can be

s u b m a r t i n g a l e s w h i c h are not n e c e s s a r i l y

n e g a t i v e but m a j o r i z e d by an ~ - b o u n d e d m a r t i n g a l e ;

in a similar way,

C o r o l l a r y 4.3.12, T h e o r e m 4.3.13, and C o r o l l a r y 4.3.14 can be modified. In a w e a k l y s e q u e n t i a l l y c o m p l e t e B a n a c h lattice,

even this latter

188

condition

can be dropped,

general ~-bounded

4.3.15. ~

is a KB-space.

martingale

submartingale

and an ~ - b o u n d e d

The d e c o m p o s i t i o n

is the d i f f e r e n c e

of an ~ - b o u n d e d

Doob potential.

is unique.

If the s u b m a r t i n g a l e

4.3.4,

for

submartingales:

Then e v e r y ~ - b o u n d e d

process

the Riesz d e c o m p o s i t i o n

Theorem.

Suppose

Proof.

and we thus o b t a i n

is T-bounded,

then

so is the Doob potential.

C o n s i d e r an ~ - b o u n d e d s u b m a r t i n g a l e ~ . Then the set f u n c t i o n + ~ is an ~ - b o u n d e d p o s i t i v e submartingale, hence, by T h e o r e m + ~ is the d i f f e r e n c e of an ~ - b o u n d e d p o s i t i v e m a r t i n g a l e

and a T - b o u n d e d

<

Doob potential.

~

+

<

~

Then we have

,

hence

~_

:=

is an ~ - b o u n d e d difference

_~-~_ negative

submartingale.

of an ~ - b o u n d e d

martingale

By T h e o r e m ~

4.3.11,

and an ~ - b o u n d e d

~

is the

Doob p o t e n t i a l

. Thus we have

=

from w h i c h

~_ + ~_

=

_~ + ~_ - ~_

the a s s e r t i o n

follows.

F r o m the Riesz d e c o m p o s i t i o n following

characterization

4.3.16.

Theorem.

The f o l l o w i n g

,

for ~ - b o u n d e d

the

are e q u i v a l e n t :

~

(b)

Every ~-bounded

submartingale

(c)

Every ~ - b o u n d e d

positive

Proof.

is a K B - s p a c e .

Suppose

submartingale

then this

we o b t a i n

of KB-spaces:

(a)

Conversely,

submartingales,

first

that

is a strong

~

is in p a r t i c u l a r

is a KB-space.

amart,

if every ~ - b o u n d e d true

is a strong amart.

submartingale

by T h e o r e m

positive

is a strong amart.

Then e v e r y ~ - b o u n d e d

4.3.15

and T h e o r e m

submartingale

for e v e r y ~ - b o u n d e d

4.3.10.

is a strong amart,

positive

submartingale

189

on the trivial submartingale

stochastic

basis,

on the trivial

and thus for e v e r y ~ - b o u n d e d

stochastic

basis,

hence

~

is a

KB-space.

Since every B a n a c h the strong convergence

theorem

that a s l i g h t l y the p o s i t i v e

Also

lattice w i t h the R a d o n - N i k o d y m

amart convergence

for ~ - b o u n d e d

more g e n e r a l

weak potential

from the Riesz

characterization

cone a b s o l u t e l y

submartingales.

convergence

decomposition,

we o b t a i n

submartingales,

summing

theorem;

see, however,

as a c o n s e q u e n c e

see S e c t i o n

of

4.5.

the f o l l o w i n g

summing o p e r a t o r s using earlier

operators

is a KB-space,

to give a weak

We shall

r e s u l t can be o b t a i n e d

of cone a b s o l u t e l y

terms of ~ - b o u n d e d

property

t h e o r e m can n o w be used

and A L - s p a c e s

and A L - s p a c e s

characterizations in terms

in of

of Doob

potentials:

4.3.17.

Theorem.

Suppose

~

is a KB-space,

~{

is a B a n a c h

linear operator.

(a)

S

is cone a b s o l u t e l y

summing.

(b)

S

maps

submartingales

S

maps

amarts

4.3.18.

the f o l l o w i n g

the~-bounded

set f u n c t i o n

(c)

Then

space,

a bounded

processes

the ~ - b o u n d e d in

~

in

~

and

S :~

is

>

are equivalent:

in

into the T - b o u n d e d

in

into the u n i f o r m

.

submartingales

.

Corollar Y .

The f o l l o w i n g (a)

~

are equivalent: is isomorphic

(as a t o p o l o g i c a l

vector

lattice)

to an

AL-space. (b)

Every P-bounded

submartingale

is T-bounded.

(c)

Every ~-bounded

submartingale

is a u n i f o r m amart.

F r o m the u n i f o r m a m a r t c o n v e r g e n c e

4.3.19. Suppose If

~

t h e o r e m we thus obtain:

Cor01!ary. ~

is i s o m o r p h i c

is an ~ - b o u n d e d

lim D n ~ n

=

(as a t o p o l o c i a l

submartingale,

D

lim ~n

It can be seen from an e x a m p l e that the c o n d i t i o n

vector

to

It(F)

a.e.

g i v e n by B e n y a m i n i

on the B a n a c h

lattice)

then

lattice

and Ghoussoub

c a n n o t be relaxed.

[20]

190

We shall now see that in the p r e v i o u s results ~ - b o u n d e d

submartingales

can be r e p l a c e d by s u b m a r t i n g a l e s for w h i c h the p o s i t i v e part exists and is ~ - b o u n d e d .

A set f u n c t i o n process ~ satisfies the Doob c o n d i t i o n if its p o s i t i v e + part ~ exists and is ~ - b o u n d e d , and it has a K r i c k e b e r ~ d e c o m p o s i t i o n if it is the d i f f e r e n c e of a n ~ - b o u n d e d p o s i t i v e supermartingale.

For example,

in a Banach lattice w i t h p r o p e r t y

p o s i t i v e m a r t i n g a l e and a every n e g a t i v e s u b m a r t i n g a l e and,

(P), every ~ - b o u n d e d

submartingale

satisfies the Doob c o n d i t i o n and has a K r i c k e b e r g d e c o m p o s i t i o n . For general submartingales,

the Doob c o n d i t i o n and the e x i s t e n c e of a

K r i c k e b e r g d e c o m p o s i t i o n are r e l a t e d as follows:

4.3.20.

Theorem.

Suppose If

~

~

is a KB-space.

is a submartingale,

(a)

then the f o l l o w i n g are equivalent:

~

satisfies the Doob condition.

(b)

~

has a K r i c k e b e r g d e c o m p o s i t i o n .

(c)

~

is m a j o r i z e d by an ~ - b o u n d e d

Moreover,

if

~

p o s i t i v e martingale.

satisfies the Doob condition,

positive martingale majorizing +

~

then the smallest ~ - b o ~ n d e d

is given by the m a r t i n g a l e of the Riesz

d e c o m p o s i t i o n of

+ Proof.

Suppose first that

is an ~ - b o u n d e d

satisfies the Doob condition. + p o s i t i v e submartingale. By T h e o r e m 4.3.4, ~

d i f f e r e n c e of an ~ - b o u n d e d potential

~ ~

hence

~

~

positive martingale

<

~

+

=

~-~

<

~

and a T - b o u n d e d Doob

,

is the d i f f e r e n c e of the ~ - b o u n d e d

Therefore,

(a) implies

(b).

Obviously,

(b) implies

(c).

if

is the

. Thus we have

the p o s i t i v e s u p e r m a r t i n g a l e

Finally,

~

Then

positive martingale

~

and

positive martingale

~ ,

~ - ~ .

~

is m a j o r i z e d by an ~ - b o u n d e d

<

~

then we have + 0

hence

~

=

~v0

<

~

,

satisfies the Doob condition.

The final a s s e r t i o n is then obvious.

a

191 The K r i c k e b e r g d e c o m p o s i t i o n leads to the f o l l o w i n g c h a r a c t e r i z a t i o n of cone a b s o l u t e l y summing o p e r a t o r s and AL-spaces:

4.3.21. Suppose

Theorem. ~

is a KB-space,

a b o u n d e d linear operator.

~

is a B a n a c h space, and

S :~

> ~

is

Then the f o l l o w i n g are equivalent:

(a)

S

is cone a b s o l u t e l y summing.

(b)

S

maps the s u b m a r t i n g a l e s s a t i s f y i n g the Doob c o n d i t i o n in

into the T - b o u n d e d set f u n c t i o n p r o c e s s e s in

Proof.

A p p l y T h e o r e m 4.3.20 and T h e o r e m 4.3.7.

4.3.22.

Corollary.

~

.

The f o l l o w i n g are equivalent: (a)

~

is isomorphic

to an

(as a t o p o l o g i c a l vector lattice)

AL-spaCe.

(b) (c)

E v e r y s u b m a r t i n g a l e s a t i s f y i n g the Doob c o n d i t i o n is T-bounded. E v e r y s u b m a r t i n g a l e s a t i s f y i n g the Doob c o n d i t i o n is a u n i f o r m amart.

Proof.

By T h e o r e m 4.3.21 and C o r o l l a r y 4.3.9,

equivalent.

If

~

is a n A L - s p a c e ,

(a) and

(b) are

then e v e r y s u b m a r t i n g a l e s a t i s f y i n g

the Doob c o n d i t i o n i s ~ - b o u n d e d ,

by

(b), h e n c e it is a u n i f o r m amart,

by C o r o l l a r y 4.3.18. Conversely,

if

~

is not an AL-space,

then there

exists a n e g a t i v e s u b m a r t i n g a l e w h i c h is not a u n i f o r m amart, by C o r o l l a r y 4.3.14.

4.3.23. Suppose If

~

a

Corollary~ ~

is i s o m o r p h i c

(as a t o p o l o g i c a l v e c t o r lattice)

is a s u b m a r t i n g a l e s a t i s f y i n g the Doob condition,

lim DnB n

=

D

lim ~n

to

11 (r)

then

a.e.

We c o n c l u d e this s e c t i o n on s u b m ~ r t i n g a l e s w i t h a brief d i s c u s s i o n of quasimartingales.

4.3.24.

Theorem.

The f o l l o w i n g are equivalent: (a)

~

is i s o m o r p h i c

(as a t o p o l o g i c a l v e c t o r lattice)

to an

AL-space. (b)

Every ~ - b o u n d e d

s u b m a r t i n g a l e is a q u a s i m a r t i n g a l e .

(c)

Every ~ - b o u n d e d

p o s i t i v e s u b m a r t i n g a l e is a q u a s i m a r t i n g a l e .

192

Proof.

Suppose

submartingale

~

0 hence,

~

first

that

~

R n B n + 1 - Bn

for all

is an A L - s p a c e .

. Then we have,

m E~

for all

n 6~

Consider

an ~ - b o u n d e d

,

'

,

m

m

I

II ~n - Rn~n+1

II (n)

=

II ~n+1(n) - ~ n ( ~ )

Z

n=l

II

n=l

II ~m+l (~) - ~'I (s) II 2 li~l~ which

means

that

The converse

4.3.25. ~

exists

absolutely

a summable

summable.

standard

process

~

f o r all

Let

n E~

means

Example

4.3.25.

and

~

~n (Bn,k) n E~

and

decomposition

potential

n on

basis

[0,1)

,

k 6 K(n)

n E~

}

which

is n o t

, define

a set f u n c t i o n

. Then

_~

II (~)

fails

~- ~

amart.

=

X k E K(n)

=

II X n + 1 II

that ~

~

II ~ n + 1 ( B n , k )

- ~ n ( B n , k ) II

,

smallest

martingale

majorizing

by

, Clearly,

, and

is a u n i f o r m

the

given

2 -n x

k E K(n), of

positive

to b e a q u a s i m a r t i n g a l e .

process

:=

is a n H - b o u n d e d

n El~ , w e h a v e

let us r e m a r k

set f u n c t i o n

for all

{ x n£~+

sequence := X x

n Z x. j:l 3

For all

that

In a d d i t i o n ,

uniform

subsequent

2-n

:=

II ~ n - Rn~n+l

Riesz

the

by l e t t i n g

submartingale.

is the

x

stochastic

~ n (Bn ,k )

which

from

is n o t an A L - s p a c e .

there

On the

is a q u a s i m a r t i n g a l e . seen

Example.

Suppose Then

~

c a n be

,

~

is the m a r t i n g a l e

it is e a s y

potential,

to see t h a t

which

means

of the

the D o o b

that

~

is a

4.4.

U n i f o r m and

In this

section,

of p o s i t i v e

summing

p o t e n t i a l s .

9

of the c l a s s e s

u n i f o r m amarts.

operators

of all

We also

and A L - s p a c e s

in terms

strong p o t e n t i a l s .

u n i f o r m potentials.

Theorem.

Suppose

~

has p r o p e r t y

Then the c l a s s norm

stron

and of all H - b o u n d e d

cone a b s o l u t e l y

Let us first c o n s i d e r

4.4.1.

t s

we study the order p r o p e r t i e s

uniform potentials characterize

amar

p o s i t i v e

H.

func t i o n

of all u n i f o r m p o t e n t i a l s

IIT , and it is an ideal

is a B a n a c h

in the v e c t o r

lattice

lattice

for the

of all

set

processes.

Proof. Banach

(P).

By T h e o r e m

3.5.2,

space for the n o r m

the class II. 11T . If

of all u n i f o r m p o t e n t i a l s ~

is a

is a u n i f o r m potential,

then

we h a v e

lim

since

10 I ~

~i. tI(~)

is a u n i f o r m

H (~)

=

lim

is a lattice

potential.

II ~r H (n)

norm,

by T h e o r e m

The r e m a i n i n g

For the class of all ~ - b o u n d e d

=

uniform

assertion

amarts,

0

4.1.3.

Therefore,

~I

is obvious.

D

we have a less g e n e r a l

result:

4.4.2.

Theorem.

Suppose

~

is an AL-space.

Then the class of all H - b o u n d e d the n o r m

It. II T

Proof.

By T h e o r e m

is a B a n a c h amart

~

uniform amarts

is a B a n a c h

lattice

for

" 3.5.7,

the class of all H - b o u n d e d

space for the n o r m

. By the Riesz

II. itT

decomposition,

• Consider ~

u n i f o r m amarts

an H - b o u n d e d

uniform

is the sum of an H - b o u n d e d

martingale ~ and a u n i f o r m p o t e n t i a l ~ . Then the set f u n c t i o n .+ process ~ is an ~ - b o u n d e d p o s i t i v e submartingale. By C o r o l l a r y 4.3.18, .+ is a u n i f o r m amart, h e n c e it is the sum of an ~ - b o u n d e d m a r t i n g a l e and a u n i f o r m p o t e n t i a l

~

. Thus we have

194

t~ ÷ - ~ i

~

By T h e o r e m 4.4.1,

t~+ - ~ + i

{~i

u n i f o r m potential, hence + set f u n c t i o n process ~

+ ~

<

t~-~t

+ ~

=

t~i +

is a u n i f o r m p o t e n t i a l and thus + ~ -~ is a u n i f o r m potential. is

an ~-bounded

uniform

amart,

{~+-~l

is a

Therefore,

the

from

the

which

a s s e r t i o n follows.

D

The following c h a r a c t e r i z a t i o n of cone a b s o l u t e l y summing o p e r a t o r s and A L - s p a c e s in terms of p o s i t i v e strong p o t e n t i a l s is similar to T h e o r e m 3.4.5 and C o r o l l a r y 3.4.6, and to T h e o r e m 3.5.8 and C o r o l l a r y 3.5.9:

4.4.3. Suppose

Theorem. ~

is a Banach lattice,

~

is a Banach space, and

S :

is a b o u n d e d linear operator. Then the following are equivalent: (a) S is cone a b s o l u t e l y summing. (b)

S

maps the (~-bounded)

p o s i t i v e strong p o t e n t i a l s in

~

into

~

into

~

is a

the T - b o u n d e d set function p r o c e s s e s in

(c)

S

maps the (~-bounded)

p o s i t i v e strong p o t e n t i a l s in

the u n i f o r m p o t e n t i a l s in Proof.

Suppose first that

S

p o s i t i v e strong p o t e n t i a l in

0

<

lim

II S~T II(n)

by T h e o r e m 4.1.5, hence Conversely, an ~ - b o u n d e d

if

S

~

S~

~

.

is cone a b s o l u t e l y summing.

<

II S II1 lim

II ~T(~)

<

II S II1 lim

III ~T III(n)

II =

0

,

is a u n i f o r m p o t e n t i a l and thus T-bounded.

is not cone a b s o l u t e l y s u m m i n g , then there exists

p o s i t i v e strong p o t e n t i a l

~

in

~

T - b o u n d e d and thus cannot be a u n i f o r m potential, 4.4.4.

If

, then we have

such that

S~

is not

by Example 4.2.2.

Corollary.

The f o l l o w i n g are equivalent: (a)

~

is isomorphic

(as a t o p o l o g i c a l v e c t o r lattice)

to an

AL-space. (b)

Every (~-bounded)

p o s i t i v e strong p o t e n t i a l

(c)

Every (~-bounded)

p o s i t i v e strong p o t e n t i a l is a u n i f o r m

is T-bounded.

potential.

F r o m the u n i f o r m p o t e n t i a l c o n v e r g e n c e t h e o r e m we thus obtain:

[]

195

4.4.5. Suppose If

~

Corollary. ~

is isomorphic

is a p o s i t i v e strong potential,

lim DnB n

=

For Doob potentials,

4.4.6. Suppose If

~

(as a t o p o l o g i c a l v e c t o r lattice)

0

to

It(F)

to

II(F)

then

a.e.

this yields:

Corollary. ~

is isomorphic

(as a t o p o l o g i c a l v e c t o r lattice)

is a Doob potential,

lim DnB n

=

0

then

a.e.

The p r e v i o u s result is also c o n t a i n e d in C o r o l l a r y 4.3.19. Again, can be seen from an example due to B e n y a m i n i and G h o u s s o u b the c o n d i t i o n on the B a n a c h lattice c a n n o t be relaxed.

it

[20] that

4.5.

Weak and

amarts p o s i t i v e

weak

p o t e n t i a l s .

Similar to the e x t e n s i o n of the strong c o n v e r g e n c e t h e o r e m for strong p o t e n t i a l s from finite d i m e n s i o n a l B a n a c h spaces to of p o s i t i v e strong potentials,

If(F)

in the case

there exists an e x t e n s i o n of the weak

c o n v e r g e n c e t h e o r e m for u n i f o r m weak p o t e n t i a l s in the case of p o s i t i v e u n i f o r m weak potentials.

The w e a k c o n v e r g e n c e t h e o r e m for p o s i t i v e

u n i f o r m w e a k p o t e n t i a l s is the main result of this section, and it yields weak c o n v e r g e n c e theorems for Doob p o t e n t i a l s and submartingales.

The f o l l o w i n g result is the B a n a c h lattice v e r s i o n of T h e o r e m 3.6.1:

4.5.1.

Theorem.

The f o l l o w i n g are equivalent: (a)

~

(b)

Every weak amart is a u n i f o r m weak amart.

is a KB-space.

Proof.

A B a n a c h lattice is a K B - s p a c e if and only if it is w e a k l y

s e q u e n t i a l l y complete. N o w the a s s e r t i o n follows from T h e o r e m 3.6.1.

a

We thus obtain the f o l l o w i n g w e a k amart c o n v e r g e n c e theorem:

4.5.2. Suppose If

~

Corollary. ~

has the R a d o n - N i k o d y m p r o p e r t y and a separable dual.

i s a T - b o u n d e d weak amart, then

w - l i m Dn~ n Proof.

=

D

w - l i m ~n

a.e.

A B a n a c h lattice h a v i n g the R a d o n - N i k o d y m p r o p e r t y does not

c o n t a i n a Banach sublattice isomorphic to

co

and h e n c e is a KB-space.

Now the a s s e r t i o n follows from T h e o r e m 4.5.1 and C o r o l l a r y 3.6.8. The p r e v i o u s results suggest the i n t r o d u c t i o n of a type of p o t e n t i a l c o r r e s p o n d i n g to weak amarts:

A set f u n c t i o n process { U~(n)

I T 6 T }

~

is a w e a k p o t e n t i a l if the net

w e a k l y c o n v e r g e s to

For weak p o t e n t i a l s w h i c h are positive, T h e o r e m 4.5.1:

0 .

there is a partial a n a l o g u e to

a

197

4.5.3.

Theorem.

Suppose

~

is a KB-space.

Then every p o s i t i v e weak p o t e n t i a l

Proof.

is a u n i f o r m weak potential.

Consider a positive weak potential

is a u n i f o r m weak amart. equal to

Since

0 , w h i c h means that

~

~

~

. By T h e o r e m 4.5.1,

is positive,

its limit m e a s u r e is

is a u n i f o r m w e a k potential,

o

Thus we have, by the u n i f o r m w e a k p o t e n t i a l c o n v e r g e n c e theorem:

4.5.4.

Corollary.

Suppose If

~

~

has the R a d o n - N i k o d y m p r o p e r t y and a separable dual.

is a T - b o u n d e d p o s i t i v e w e a k potential,

w - l i m Dn~ n

=

0

then

a.e.

The p r e v i o u s result can be improved. To this end, let us recall the f o l l o w i n g definition:

If

~

is a Banach lattice,

o r t h o g o n a l system of By

~

then a set

S c ~+

is a t o p o l Q @ i c a l

if the ideal g e n e r a t e d by

S

is dense in

~

.

[109; P r o p o s i t i o n II.6.2], e v e r y s e p a r a b l e B a n a c h lattice has a

q u a s i - i n t e r i o r point and thus p o s s e s s e s a t o p o l o g i c a l o r t h o g o n a l system c o n s i s t i n g of one point only. Therefore, theorems,

in the s u b s e q u e n t c o n v e r g e n c e

the c o n d i t i o n s imposed on the B a n a c h lattice are less

r e s t r i c t i v e than those in C o r o l l a r y 4.5.4. We can now state the p o s i t i v e w e a k p o t e n t i a l c o n v e r g e n c e theorem:

4.5.5. Suppose

Theorem. ~

has the R a d o n - N i k o d y m p r o p e r t y and a c o u n t a b l e t o p o l o g i c a l

o r t h o g o n a l system in its dual. If

~

is a T - b o u n d e d p o s i t i v e weak potential,

w - l i m Dn~ n Proof.

Since

(Lemma 3.5.10)

su~

~

=

0

a.e.

is T-bounded,

it follows from the maximal i n e q u a l i t y

that there exists a null set

II (Dn~ n) (~) II

is finite for all

~ £ ~A

then

.

A EL

such that the value

198

Now consider of

~'

a countable

. For each

lim

~ 6 ~A. for each

{ Z H e' ^ p e ~ converges Thus,

to set

e' E ~ H c~

0

becomes

{ e~ 6 ~ I J E~ 3 Aj £ L such that

a null set

(Dnei~ n) (~) 3.1.11

e' E ~ :

, the net

I P E~

,

H c~

=

0

and Theorem

finite

2.5.13.

}

and

~ £~A~(

~

Aj)

, we may choose

such that the last expression

(e'Dn~ n) (~)

<_

l e ' - r H e' Ape31

II (Dn~n) (~) [l +

<

[e' - Z H e' ^Pe3]

lJ (Dn~ n) (co) [J + p Z

lim

small for all

(e'Dn~ n) (~)

e' 6 ~

and

=

n q~

p 6~

and

of the inequality

<

arbitrarily

for all

lim

system

e'

for each

a finite

=

, by Theorem

3

orthogonal

, there exists

(eiDn~n) (co)

holds for all Furthermore,

j £~

topological

(Z H e' Ape3) (Dn~n) (~)

sufficiently

(e3Dn~ n) (co) large.

This yields

0

~ E ~A~(

~

AS)

, from which the assertion

follows. From an example given by Ghoussoub that the existence

of a countable

dual is a necessary

condition

and Talagrand topological

in the positive

[77] it can be seen

orthogonal

system

weak potential

in the

convergence

theorem. 4.5.6. Suppose

Corollary. ~

orthogonal If

~

has the Radon-Nikodym

is a T-bounded w-lim Dn~ n

Proof. Theorem

property

and a countable

topological

system in its dual. Doob potential, =

0

a.e.

Every Doob potential 4.3.10,

hence

then

is a positive

it is a positive

strong potential,

weak potential.

by O

}

199

4.5.7. Suppose

Corollary. ~

orthogonal If

~

has the Radon-Nikodym property and a countable topological system in its dual.

is a T-bounded submartingale,

w-lim Dn~ n Proof.

=

D

w-lim ~n

then

a.e.

Apply Theorem 4.3.15.

By the above-mentioned example, the existence of a countable topological orthogonal

system in the dual is also a necessary condition in Corollary

4.5.6 and Corollary 4.5.7. Further applications of the positive weak potential convergence theorem will be given in Section 4.6.

4.6.

O r d e r

Order

amarts

f o r m the n a t u r a l

of the p a r t i a l Banach does

in o r d e r

class

of the B a n a c h amart

amarts

order about

is m a i n l y

lattice

of B a n a c h

In w h a t

generalization

every

say v e r y m u c h

form a vector

.

ordering

lattice,

not

a m a r t s

follows,

we

due

than

shall

lattice.

is a s t r o n g

the p r o p e r t i e s to the f a c t

and admit

lattices

of s u b m a r t i n g a l e s

a weak

strong

In a n o r d e r amart,

but

of o r d e r

that

amarts

continuous

this

amarts.

theorem

observation The

the T - b o u n d e d

convergence

in t e r m s

interest

order

amarts

in a l a r g e r

do.

write

o-lim

for the o r d e r

limit

A set f u n c t i o n is o r d e r

Similar their

process

to real

amarts,

is o r d e r

(a)

order

if the n e t

{ ~T(0)

I ~ 6 T }

amarts

m a y be c h a r a c t e r i z e d

in t e r m s

of

complete. process,

is a n o r d e r

(b) (c)

o-lim

I~T-R ~ I ( 0 ) = 0

.

exists

measure

= o-lim

There ~(n)

Proof.

exists = o-lim

Suppose

modification the e x i s t e n c e

measures

by L e m m a

4.1.1.

remaining

amarts

a vector

a vector ~r(A)

following

are equivalent:

~ £ a(F

~ 6 a(F

for all

measure

A6

~ E a(F

, ~)

such

that

, ~)

such

that

such

that

F , ~)

~T(n)

first

that

limit

~T- R ~ As

measure

holds

a vector

of the p r o o f of the

the

amart.

exists

~(A) (d)

then

There

There

Order

amart

measure:

is a set f u n c t i o n

vector

is an o r d e r

n e t or s e q u e n c e .

Theorem.

Suppose

The

~

convergent

convergent.

limit

4.6.1 .

If

of an o r d e r

in the

implications

~

given

is

an order

in the

measure is o r d e r real are

~

and also

bounded

case,

amart.

real c a s e

shows

a n d thus

we o b t a i n

A straightforward

(Theorem that

2.5.4)

possesses

o-lim

a modulus,

I~T-Rr~I(Q)

obvious,

m a y a l s o be c h a r a c t e r i z e d

yields

e a c h of the

= 0 o

by a difference

property:

201

4.6.2.

Corollary.

Suppose If

~

~

is o r d e r complete.

is a set function process,

then the f o l l o w i n g are equivalent:

(a)

~

is an order amart.

(b)

o-lim suPT(T ) I~r-R ~al(~)

Proof.

Suppose first that

~

= 0

is an order amart w i t h limit m e a s u r e

. By T h e o r e m 4.6.1, there exists a net d i r e c t e d d o w n w a r d and d e c r e a s e s to

I~ z - RZ~I(~) holds for all downward,

~

~ qT

Consider

I ~ £T

}

w h i c h is

e

• E T . Since the net

and

~ q T ,

5

{ e T E~+

I ~ £ T }

is d i r e c t e d

e

v E T(K) z ET(K)

and

I(~ -Rx~a)(C)I hence,

[ eT 6~+

such that

we even have

I~v - Rv~l(n) for all

0

for all

A E Fz

~ and

aET(T)

lU - R x ~ I ( c ) B E FT(A)

. Then we have, for all

+ IRa~-~aI(C)

C E FT

,

,

I ~ - R ~l(n) + IRa~-~aI(Q) Therefore,

I~T-Rr~ol

exists,

is order complete,

since

and the

previous inequality yields

I~ z - RT~aI(~)

~

2 e

Thus we have

suPT(T) for all

T E T(M)

[~T- RT~c[(Q)

~

2 e

. The c o n v e r s e i m p l i c a t i o n is obvious.

In an order c o n t i n u o u s B a n a c h lattice, every order amart c l e a r l y is a strong amart. The r e l a t i o n b e t w e e n order amarts and u n i f o r m amarts is c l a r i f i e d by the f o l l o w i n g c h a r a c t e r i z a t i o n of cone a b s o l u t e l y summing o p e r a t o r s and AL-spaces:

202 4.6.3.

Theorem.

Suppose and

~

is an order c o n t i n u o u s B a n a c h lattice,

S :~

) ~

~

is a B a n a c h space

is a b o u n d e d linear operator. Then the f o l l o w i n g are

equivalent:

(a)

S

is cone a b s o l u t e l y summing.

(b)

S

maps the ~ - b o u n d e d

order a m a r t s in

set f u n c t i o n p r o c e s s e s in

(c)

S

maps the (~-bounded)

a m a r t s in

Proof.

~

f' 6 ~

.

o r d e r amarts in

~

into the u n i f o r m

S

is cone a b s o l u t e l y summing. Then there

such that

II Sx II holds for all

into the T - b o u n d e d

.

Suppose first that

exists

~

~

<

x E~

f' (Ixl)

. C o n s i d e r an order a m a r t

proof of T h e o r e m 4.1.9,

~

in

~

. As in the

it can be seen that

II S~ T - R T S ~ o ll(n)

=

II S ( ~ T - R T ~ o) If(Q)

f'(I~T-RT~oI(n))

f'(SUPT(T) holds for all properties, Therefore, Clearly,

T 6 T

and

this means that (a) implies

(c) implies

(b) implies 4.6.4.

o E T(T) S~

IBT-RTBoI(Q))

. By the r e s p e c t i v e d i f f e r e n c e is a u n i f o r m amart.

(c).

(b), and it can be seen from E x a m p l e 4.2.2 that Q

(a), since every Doob p o t e n t i a l is an o r d e r amart.

Corollary.

The f o l l o w i n g are equivalent: (a)

~

is isomorphic

(as a t o p o l o g i c a l v e c t o r lattice)

to an

AL-space. (b)

Every ~ - b o u n d e d

(c)

Every (~-bounded)

4.6.5. Suppose If

~

order a m a r t is T-bounded. order a m a r t is a u n i f o r m amart.

Corollary. ~

is isomorphic

is an ~ - b o u n d e d

lim Dn~ n

=

(as a t o p o l o g i c a l vector lattice)

order amart,

D

l~m ~n

then

a.e.

to

II(F)

203 A set f u n c t i o n p r o c e s s all

T 6 T

Clearly,

~

is an o r d e r p o t e n t i a I if

and if the net

{ I~TI(~)

I T £ T }

I~ I

exists for

order c o n v e r g e s to

every Doob p o t e n t i a l is an order potential,

0

and we also have

the f o l l o w i n g result:

4.6.6.

Theorem.

Suppose

~

has p r o p e r t y

(P).

Then the class of all T - b o u n d e d order p o t e n t i a l s is a vector lattice, and it is an ideal in the v e c t o r lattice of all set f u n c t i o n processes.

Proof.

Since

~

has p r o p e r t y

(P), it follows from T h e o r e m 4.1.3

that the sum of two order p o t e n t i a l s a set f u n c t i o n process function process

I~I

~

is an order potential. Moreover,

is an order p o t e n t i a l

if and only if the set

is an order potential,

a

It is c l e a r that a n a l o g o u s results h o l d for the c l a s s of all o r d e r p o t e n t i a l s and for the class of all P - b o u n d e d

order potentials,

but the

case of T - b o u n d e d order p o t e n t i a l s is the i m p o r t a n t one. In o r d e r to prove an a n a l o g o u s result for the class of all T - b o u n d e d o r d e r amarts, let us first prove the Riesz d e c o m p o s i t i o n f o r ~ - b o u n d e d

4.6.7.

order amarts:

Theorem.

Suppose

~

is o r d e r continuous.

T h e n every P - b o u n d e d and an P - b o u n d e d

order amart is the sum of an P - b o u n d e d m a r t i n g a l e

order potential.

The d e c o m p o s i t i o n is unique. If the order amart is T-bounded,

Proof. Since

~

then so is the order potential.

C o n s i d e r an P - b o u n d e d

o r d e r amart

is order continuous,

~

d e c o m p o s i t i o n for P - b o u n d e d

~

w i t h limit m e a s u r e

is a strong amart. By the Riesz

strong amarts,

the limit m e a s u r e

b o u n d e d v a r i a t i o n and g e n e r a t e s an P - b o u n d e d m a r t i n g a l e

:=

{ Rn~

I n 6P

}

.

Then the set f u n c t i o n p r o c e s s

is an order potential, by T h e o r e m 4.6.1. The r e m a i n i n g a s s e r t i o n s are obvious.

~

has

~ .

204

We can now d e s c r i b e the s t r u c t u r e of the class of all T - b o u n d e d order amarts:

4.6.8.

Theorem.

Suppose

~

is a KB-space.

Then the class of all T - b o u n d e d order amarts is a v e c t o r lattice.

Proof.

C o n s i d e r a T - b o u n d e d order amart

decomposition,

~

T - b o u n d e d order p o t e n t i a l an Y - b o u n d e d

~

~

~

~

and a

By T h e o r e m 4.3.4,

positive martingale

~

~+

~+

is

is the

and a T - b o u n d e d Doob

. Thus we have

I~ + - ~ I Since + -~

. By the Riesz

. Then the set function process

p o s i t i v e submartingale.

d i f f e r e n c e of an ~ - b o u n d e d potential

~

is the sum of an Y - b o u n d e d m a r t i n g a l e

and

~

I~ + - ~ + I

+ ~

<

t~-~l

+ ~

=

I~I + ~

.

~

are T - b o u n d e d order potentials, the same is true for + . Therefore, the set f u n c t i o n process ~ is a T - b o u n d e d order

amart, f r o m w h i c h the a s s e r t i o n follows,

u

It is clear that an a n a l o g o u s result holds for the class of all Y - b o u n d e d o r d e r amarts.

The n e x t result is the o r d e r a m a r t c o n v e r g e n c e theorem:

4.6.9. Suppose

Corollary. ~

has the R a d o n - N i k o d y m p r o p e r t y and a c o u n t a b l e t o p o l o g i c a l

o r t h o g o n a l s y s t e m in its dual. If

~

is a T - b o u n d e d order amart,

w - l i m Dn~ n Proof.

=

D

lim ~n

then

a.e.

By the Riesz d e c o m p o s i t i o n ,

martingale

~

~

is the sum of a n Y - b o u n d e d

and a T - b o u n d e d o r d e r p o t e n t i a l

~ . Then we have, by

the v e c t o r lattice p r o p e r t y of the T - b o u n d e d order potentials, _~

=

_~ + _~+ - _~-

The m a r t i n g a l e c o n v e r g e n c e t h e o r e m y i e l d s

lim D n 5 n

=

D

lim ~n

a.e.,

205

since

~

and

~

have the same limit measure. Moreover,

order continuous,

the T - b o u n d e d p o s i t i v e order p o t e n t i a l s

since

~

~+

and

is ~-

are strong potentials, hence weak potentials. N o w the p o s i t i v e weak potentialconvergence

t h e o r e m yields

w - l i m Dn ~+n

=

0

a.e.

w - l i m Dn~ ~

=

0

a.e.

=

D~ lim ~n

and

Thus we have

w - l i m Dn~ n

a.e.,

as was to be shown.

We c o n c l u d e this section on order amarts with a brief d i s c u s s i o n of hypomartingales.

A set function process

is a h y p o m a r t i n g a l e if it is the d i f f e r e n c e of a

m a r t i n g a l e and a p o s i t i v e order potential. is an order amart. Also, a hypomartingale,

in a KB-space,

and every ~ - b o u n d e d

Clearly,

every h y p o m a r t i n g a l e

every ~ - b o u n d e d

s u b m a r t i n g a l e is

order amart is the d i f f e r e n c e of

two h y p o m a r t i n g a l e s .

we shall now see that the p r o p e r t i e s of p o s i t i v e h y p o m a r t i n g a l e s are similar to those of p o s i t i v e submartingales.

The first result is the Riesz d e c o m p o s i t i o n for ~ - b o u n d e d

positive

hypomartingales:

4.6.10. Suppose

Theorem. ~

is order continuous.

Then every H - b o u n d e d an ~ - b o u n d e d

p o s i t i v e h y p o m a r t i n g a l e is the d i f f e r e n c e of

p o s i t i v e m a r t i n g a l e and a T - b o u n d e d p o s i t i v e order potential.

The d e c o m p o s i t i o n is unique.

Proof.

C o n s i d e r an H - b o u n d e d

exists a m a r t i n g a l e

0

F i r s t of all,

<

~

~

~

=

positive hypomartingale

and a p o s i t i v e order p o t e n t i a l

_~-~

<

~ . Then there ~

satisfying

~

is c l e a r l y positive. Moreover,

if

~

is c o n s i d e r e d

206

as an order amart, then it is clear from the Riesz decomposition for order amarts that inequality, 4.6.11. Suppose If

~

~

~

is ~-bounded,

is T-bounded,

hence T-bounded.

hence

~ = ~- ~

By the above

is T-bounded.

Cgrollary. ~

is order continuous.

is a positive hypomartingale,

(a)

~

is ~-bounded.

(b)

~

is T-bounded.

The main result on hypomartingales

then the following are equivalent:

is the positive hypomartingale

convergence theorem: Theorem.

4.6.12.

Suppose If

~

~

has the Radon-Nikodym property.

is an ~ - h o u n d e d positive hypomartingale,

lim Dn~ n

=

D

lim ~n

then

a.e.

The proof is the same as the proof of the positive submartingale convergence theorem.

4.7.

R e m a r k s .

A vector measure two o r t h o g o n a l lattice,

has a Jordan

positive

a vector measure

it is o r d e r bounded, variation

measures.

has a J o r d a n

by L e m m a

4.1.1.

in an o r d e r c o m p l e t e

decomposition AL-space, Schmidt

decomposition

vector

by Faires [119]

and M o r r i s o n

submartingales

[69]

were

in his p a p e r on the c o n v e r g e n c e strong

convergence

theorem

by Szulga and W o y c z y n s k i

r e s u l t can be o b t a i n e d theorem which

of the K a d e c - K l e e Ghoussoub,

convergence

[26,28],

Bru and H e i n i c h

positive

hypomartingale

submartingale

Since the p r o p e r t i e s

theorem;

amart

4.3.24;

is a strong amart,

Theorem

4.3.16.

submartingales, Doob p o t e n t i a l

Thus,

submartingales

which

convergence

theorem,

Radon-Nikodym

amart,

question

uniform

of T h e o r e m

these B a n a c h

these Banach

l a tt i c e s

property.

in w h i c h B a n a c h

form a B a n a c h

4.4.2.

Since every generalize

since every u n i f o r m

have

by an H - b o u n d e d

Apparently,

to

lattices

to be K B - s p a c e s ,

for H - b o u n d e d

lattices

these q u e s t i o n s

every

is a

submartingale

to k n o w w h e t h e r

the B a n a c h

by

positive

lattices

martingale

in v i e w of the p o s i t i v e

includes

similar

to ask

ask in w h i c h B a n a c h

it w o u l d be i n t e r e s t i n g lattices

the p o s i t i v e

[74].

amarts

by the Riesz d e c o m p o s i t i o n

is m a j o r i z e d

extends

in

is a u n i f o r m amart.

on the o t h e r hand,

Furthermore,

this class of B a n a c h

theorem

Davis,

of the p o s i t i v e

are very

submartingale

one may e q u i v a l e n t l y

u n i f o r m potential.

proof

see also G h o u s s o u b

the H - b o u n d e d

is a u n i f o r m

by T h e o r e m

lattices,

and stated the

theorem which

as can be seen from the proof

AL-spaces,

Banach

convergence renorming

hypomartingales

it is a natural

lattice,

a lattice

introduced

positive

quasimartingale

submartingale

their

paper q u o t e d

latti c e s

lattice,

submartingale,

In an u n p u b l i s h e d

those of u n i f o r m amarts,

In such a Banach

The first

submartingales

the s u b m a r t i n g a l e s

[46] gave a d i f f e r e n t

of p o s i t i v e

every ~-bounded

[108]

theorem.

convergence

convergence

by Scalora

seen to be the sum of

positive

[82]. U s i n g

and by

(P).

martingales.

Since

for o r d e r c o n t i n u o u s

and L i n d e n s t r a u s s

submartingale

[127].

are easily

from the p o s i t i v e

type

property

vector-valued

and an ~ - b o u n d e d

is due to H e i n i c h

of a Jordan

in the case of an

lattice h a v i n g

of v e c t o r - v a l u e d

by Szulga and W o y c z y n s k i

if

of b o u n d e d

in the case of a KB-space,

for c e r t a i n

considered

martingale

[48]

of

vector

if and only

the e x i s t e n c e

already mentioned

was p r o v e n

an ~ - b o u n d e d

lattice,

and Faires

in the case of a B a n a c h

Vector-valued

decomposition

For v e c t o r m e a s u r e s

Banach

was p r o v e n by Diestel

if it is the d i f f e r e n c e

In an order c o m p l e t e

or not

having

have not been

the

2O8

a n s w e r e d in the literature. theM-bounded

C o r r e s p o n d i n g p r o b l e m s arise, of course,

p o s i t i v e h y p o m a r t i n g a l e s or, e q u i v a l e n t l y ,

for

for the p o s i t i v e

order p o t e n t i a l s w h i c h are m a j o r i z e d by an M - b o u n d e d martingale.

Order amarts were i n t r o d u c e d by H e i n i c h

[81] who studied these p r o c e s s e s

in an order c o m p l e t e v e c t o r lattice. G h o u s s o u b

[72] studied o r d e r am~rts

in a B a n a c h lattice and p r o v e d the order a m a r t c o n v e r g e n c e theorem. By the Riesz decomposition,

the proof of the order amart c o n v e r g e n c e

t h e o r e m can be reduced to the order potential c o n v e r g e n c e theorem:

4.7.1.

CQrollary.

Suppose

~

has the R a d o n - N i k o d y m p r o p e r t y and a c o u n t a b l e t o p o l o g i c a l

o r t h o g o n a l system in its dual. If

~

is a T - b o u n d e d order potential,

w - l i m Dn~ n

=

0

then

a.e.

By the v e c t o r lattice p r o p e r t y of the class of all T - b o u n d e d o r d e r potentials,

the o r d e r potential c o n v e r g e n c e theorem is an immediate

c o n s e q u e n c e of the p o s i t i v e w e a k p o t e n t i a l c o n v e r g e n c e theorem. We have p r e f e r r e d to prove this latter r e s u l t since it yields the weak c o n v e r g e n c e theorems for Doob p o t e n t i a l s and s u b m a r t i n g a l e s w i t h o u t appeal to order p o t e n t i a l s and order amarts.

For p o t e n t i a l s in a B a n a c h lattice,

the role of the R a d o n - N i k o d y m

p r o p e r t y is e s s e n t i a l l y the same as for p o t e n t i a l s Thus,

in a B a n a c h space.

in the case w h e r e the set f u n c t i o n p r o c e s s e s are o b t a i n e d by

integrating stochastic processes, weak c o n v e r g e n c e obtains for T - b o u n d e d positive uniform weak potentials

in an a r b i t r a r y B a n a c h lattice, hence

for T - b o u n d e d Doob p o t e n t i a l s and T - b o u n d e d p o s i t i v e order p o t e n t i a l s in an order c o n t i n u o u s Banach lattice, and for T - b o u n d e d p o s i t i v e weak p o t e n t i a l s and a r b i t r a r y T - b o u n d e d order p o t e n t i a l s in a KB-space; also,

strong c o n v e r g e n c e obtains for p o s i t i v e strong potential~,

potentials,

and order p o t e n t i a l s in an AL-space.

Furthermore,

Doob

it is

p o s s i b l e to prove c o n v e r g e n c e theorems for order b o u n d e d stochastic p r o c e s s e s in an order c o n t i n u o u s B a n a c h lattice; and L i n d e n s t r a u s s

[46], and G h o u s s o u b

G h o u s s o u b and T a l a g r a n d

see Davis, Ghoussoub,

[71,74]. Let us a l s o remark that

[76] p r o v e d the order c o n v e r g e n c e of order

b o u n d e d order amarts in an order c o n t i n u o u s B a n a c h lattice; Ghoussoub

see also

[74].

The first c h a r a c t e r i z a t i o n s of cone a b s o l u t e l y summing o p e r a t o r s and

209

AL-spaces Szulga

in terms of s u b m a r t i n g a l e s

[124,125,126]

were o b t a i n e d to the v a r i o u s and A L - s p a c e s following

and G h o u s s o u b

by Bru and H e i n i c h

given

[72];

[25,28]

characterizations already

and o r d e r a m a r t s w e r e given by further

results

and by E g g h e

of cone a b s o l u t e l y

in this chapter,

of this type

[67].

summing

let us also

In a d d i t i o n operators

include

the

results:

4.7.2.

Theorem.

Suppose

~

is a KB-space,

~

is a B a n a c h

a bounded

linear operator.

(a)

S

is cone

Then

(b)

S

maps the s u b m a r t i n g a l e s

(c)

S

Proof. implies

maps

set f u n c t i o n

By T h e o r e m

(a) implies

the n e g a t i v e

martingale

is

>

the Doob c o n d i t i o n

processes

satisfying

into the ~ - b o u n d e d

(a), c o n s i d e r

S :~

are equivalent:

satisfying

set f u n c t i o n

4.3.21,

and

summing.

the m a r t i n g a l e s

is the p o s i t i v e

4.7.3.

the f o l l o w i n g

absolutely

into the ~ - b o u n d e d

space,

in

~

the Doob c o n d i t i o n

processes

in

~

in

.

(b). In o r d e r to see that

martingale

constructed

~

:= -~

in Example

in

.

in

~

(c)

, where

4.3.8.

Corollary.

The f o l l o w i n g (a)

~

are equivalent: is isomorphic

(as a t o p o l o g i c a l

vector

lattice)

to an

AL-space. (b)

Every

(c)

Every martingale

The f o l l o w i n g

4.7.4.

results

satisfying

satisfying

concern

the Doob c o n d i t i o n

the Doob c o n d i t i o n

is ~ - b o u n d e d .

is ~ - b o u n d e d .

order potentials:

Theorem.

Suppose and

submartingale

is an o r d e r c o n t i n u o u s

S :~

> ~

is a b o u n d e d

Banach

lattice,

linear operator.

~

Then

is a B a n a c h the f o l l o w i n g

space, are

equivalent: (a)

S

is cone a b s o l u t e l y

(b)

S

maps

T-bounded

(c)

S

maps

set f u n c t i o n

proof

Apply of T h e o r e m

order p o t e n t i a l s processes

the ( ~ - b o u n d e d )

uniform potentials

Proof.

summing.

the (~-bounded)

Theorem 4.6.3.

4.4.3

in

in

~

order p o t e n t i a l s ~

in

into the

in

into the

.

.

and E x a m p l e

4.2.2,

or p r o c e e d

as in the []

210

4.7.5.

Cprollary.

The f o l l o w i n g are equivalent: (a)

~

is isomorphic

to an

(as a t o p o l o g i c a l vector lattice)

AL-space. (b)

Every (~-bounded)

order p o t e n t i a l is T-bounded.

(c)

Every (~-bounded)

order potential

4.7.6. Suppose If

~

is a u n i f o r m potential.

Corollary. ~

is isomorphic

(as a t o p o l o g i c a l vector lattice)

is an order potential,

lim Dn~ n

=

0

ll(r)

to

then

a.e.

We remark that in these c h a r a c t e r i z a t i o n s of cone a b s o l u t e l y summing o p e r a t o r s and A L - s p a c e s only a very limited number of set f u n c t i o n p r o c e s s e s is r e q u i r e d to p r o v i d e the n e c e s s a r y c o u n t e r e x a m p l e s .

It is w e l l - k n o w n that an A L - s p a c e has the R a d o n - N i k o d y m p r o p e r t y if and only if it is isomorphic

(as a t o p o l o g i c a l vector lattice)

to

II(F)

There exist also c h a r a c t e r i z a t i o n s of these Banach lattices in terms of s u b m a r t i n g a l e s and order amarts. theorems in

II(F)

These results are r e l a t e d to c o n v e r g e n c e

, and the c o u n t e r e x a m p l e s w h i c h are i n v o l v e d are

c l e a r l y p r o b a b i l i s t i c and not m e a s u r e t h e o r e t i c a l ones; and G h o u s s o u b

[20], Egghe

[67], G h o u s s o u b

see B e n y a m i n i

[72,74], and Szulga

[124,125].

It w o u l d c e r t a i n l y be i n t e r e s t i n g to d e v e l o p a p u r e l y v e c t o r lattice t h e o r e t i c a l theory of order amarts in an order c o m p l e t e v e c t o r lattice w i t h o u t topology.

For order amarts of order b o u n d e d v e c t o r measures,

this has b e e n done by H e i n i c h

[81]. The critical point, however,

is the

a p p l i c a t i o n of these results to order amarts of r a n d o m variables. In order to a v o i d the i n t r o d u c t i o n of a topology, Bru

[24] c o n s t r u c t e d

an order integral for r a n d o m v a r i a b l e s in a wide class of o r d e r c o m p l e t e v e c t o r lattices.

In an order c o n t i n u o u s B a n a c h lattice,

the v e c t o r

lattice of all order integrable r a n d o m v a r i a b l e s in the sense of Bru c o i n c i d e s with the class of all random v a r i a b l e s p o s s e s s i n g a Pettis integrable modulus, w h i c h were also c o n s i d e r e d by Bru and H e i n i c h [25,26,28].

5.

F u r t h e r

a s p e c t s

of

amar

t

theory

.

In the literal sense, amarts should a s y m p t o t i c a l l y a p p r o a c h martingales. For a real or v e c t o r - v a l u e d set f u n c t i o n process

~

to be an amart,

this r e q u i r e m e n t means that there should exist a m a r t i n g a l e that the net

{ ~T - ~T

I ~ £ T }

~

such

c o n v e r g e s to zero in some sense.

The e x i s t e n c e of such a Riesz d e c o m p o s i t i o n is, of course, e q u i v a l e n t to the e x i s t e n c e of a limit m e a s u r e R ~ ,

~

such that the r e s t r i c t i o n s

T E T , have b o u n d e d v a r i a t i o n and the net

c o n v e r g e s to zero. Actually,

{ ~ T - RT~

I • £ T }

it is the type of c o n v e r g e n c e to zero of

these nets w h i c h d e t e r m i n e s the p r o p e r t i e s of the amart

~ . As in the

case of u n i f o r m amarts,

the type of c o n v e r g e n c e to zero of the nets

{ ~T-~r

{ ~ T - RT~

I T £T

}

and

I T £T

}

c a n n o t in general be

e x p r e s s e d by a c o n v e r g e n c e p r o p e r t y of the net Also, as in the c a s e of u n i f o r m w e a k amarts, measure

5

and the m a r t i n g a l e

~

{ BT (~)

I T C T }

the e x i s t e n c e of the limit

c a n n o t in g e n e r a l be d e d u c e d from a

d i f f e r e n c e property.

Quite generally,

the e x i s t e n c e of a limit m e a s u r e a l s o plays an e s s e n t i a l

role in the d e f i n i t i o n of the s t o c h a s t i c p r o c e s s e s in a B a n a c h space h a v i n g the R a d o n - N i k o d y m p r o p e r t y for w h i c h B e l l o w and Egghe

[18,19]

e s t a b l i s h e d p o i n t w i s e i n e q u a l i t i e s of the F a t o u - C h a c o n - E d g a r type; also B e l l o w

see

[15]. The stochastic p r o c e s s e s c o n s i d e r e d by these a u t h o r s

are d e f i n e d by the f o l l o w i n g p r o p e r t y of the induced set f u n c t i o n process: There exists an i n c r e a s i n g sequence

{ Tn E T(n)

stopping times such that the v a l u e

su~

exists a v e c t o r m e a s u r e

such that

holds for all

A £ F

~

; here

on Y

F

I n 6~

II ~rn 11(~) Y-lim

}

of b o u n d e d

is finite, and there (~Tn - RTn~) (A) = 0

is a H a u s d o r f f locally c o n v e x t o p o l o g y

which is w e a k e r than the n o r m t o p o l o g y and for w h i c h the unit ball is

212

closed. Evident examples of such a t o p o l o g y are the n o r m topology, the weak topology,

and, in the case of a dual B a n a c h space, the weak*

topology. C o m b i n i n g the i n e q u a l i t i e s of the F a t o u - C h a c o n - E d g a r type o b t a i n e d for the stochastic p r o c e s s e s d e s c r i b e d above w i t h a suitable d i f f e r e n c e p r o p e r t y p r o v i d e s a general concept for proving c o n v e r g e n c e theorems. This way, B e l l o w and Egghe o b t a i n e d a v a r i e t y of c o n v e r g e n c e theorems,

including those for u n i f o r m amarts and weak sequential amarts.

For related results,

see Edgar

For stochastic processes,

[54] and Egghe

[64].

there are v a r i o u s d i f f e r e n c e p r o p e r t i e s w h i c h

are r e l a t e d to d i f f e r e n t types of convergence. For example, a stochastic process

X

is a u n i f o r m a m a r t if and only if

lim suPT(T ) I 9 [ IX-

ETX o Jl dP

=

0

holds. This d i f f e r e n c e p r o p e r t y for u n i f o r m amarts is c l e a r l y r e l a t e d to L1-convergence.

Similarly,

one may formulate d i f f e r e n c e p r o p e r t i e s

for stochastic p r o c e s s e s w h i c h are r e l a t e d to c o n v e r g e n c e in p r o b a b i l i t y or to a.e. convergence.

A stochastic p r o c e s s

X

This leads to the f o l l o w i n g definitions:

is a p r a m a r t

(or amart in probability)

=

lim suPT(r ) P(IJ X T - E T x o Jl > e] holds for all

E 6 (0,~)

lim s U b ( n )

II

0

, and it is a mil

(or m a r t i n g a l e in the limit)

X n - EnX m ~I

a.e.

=

0

P r a m a r t s were i n t r o d u c e d by M i l l e t and S u c h e s t o n had been i n t r o d u c e d earlier by Mucci

[94,95,96], w h i l e mils

[97,98,99]. Every u n i f o r m amart is

a pramart, and e v e r y p r a m a r t is a mil; moreover, fail to be a pramart,

if

there exist m i l s w h i c h

and there exist p r a m a r t s w h i c h fail to be a

u n i f o r m amart. For details,

see M i l l e t and S u c h e s t o n

[96].

It is i n t e r e s t i n g to note that no stopping times are n e e d e d in the d e f i n i t i o n of a mil. This is due to the fact that m i l s are d e f i n e d p o i n t w i s e and that the i d e n t i t y

(X r - ErXo) (co) holds for all

=

(Xn - EnXm) (0~)

~ 6 {~=n}n{o=m}

. However,

in the d e f i n i t i o n of a pramart.

stopping times are e s s e n t i a l

This will be clear from the f o l l o w i n g

if

213

remark:

A stochastic process

X

lim s U b ( n ) holds for all

is a ~ame w h i c h b e c o m e s fairer w i t h time if

P(II X n - EnX m II > e)

~ E (0,~)

i n t r o d u c e d by Blake a mil. Therefore,

=

0

. Games which b e c o m e fairer w i t h time were

[135]. Every game w h i c h b e c o m e s fairer w i t h time is

there exist games w h i c h b e c o m e fairer w i t h time w h i c h

fail to be a pramart.

In the real case, the fact that every a m a r t is a mil was first proven by Edgar and Sucheston o r i g i n a t e s from the Mucci

[61]; see also Blake

[21]. The interest in mils

(real) mil c o n v e r g e n c e t h e o r e m w h i c h is due to

[99] and g e n e r a l i z e s the a m a r t c o n v e r g e n c e theorem; a n o t h e r

c o n v e r g e n c e t h e o r e m for mils was given by Y a m a s a k i

[131]. U n l i k e amarts,

however, mils have u n s a t i s f a c t o r y stability properties. B e l l o w and D v o r e t z k y

It was shown by

[17] t h a t the class of all L 1 - b o u n d e d mils need not

form a vector lattice. Furthermore,

it was shown by Edgar and S u c h e s t o n

[61] that mils need not have a Riesz decomposition,

and that the optional

stopping t h e o r e m as well as the o p t i o n a l s a m p l i n g t h e o r e m may fail for mils. As to pramarts,

it seems to be u n k n o w n w h e t h e r or not the class of

all L l - b o u n d e d p r a m a r t s forms a v e c t o r lattice. However, M i l l e t and Sucheston Thus,

[96] p r o v e d that p r a m a r t s have the o p t i o n a l sampling property.

since p r a m a r t s g e n e r a l i z e amarts,

decomposition;

see Edgar and Sucheston

In the v e c t o r - v a l u e d case,

they need not possess a Riesz [61], or T h e o r e m 2.7.4.

it seems to be an open q u e s t i o n w h e t h e r or

not every L 1 - b o u n d e d mil in a Banach space h a v i n g the R a d o n - N i k o d y m p r o p e r t y c o n v e r g e s a.e. However,

e x t e n s i o n s of the u n i f o r m amart

c o n v e r g e n c e theorem were proven by M i l l e t and S u c h e s t o n of class

[95] for pramarts

(B), w h i c h is the c o n d i t i o n of T - b o u n d e d n e s s for s t o c h a s t i c

processes,

and by P e l i g r a d

lim s U b ( n )

I~

[103] for m i l s s a t i s f y i n g the c o n d i t i o n

II X n - E n X m II dP

=

0

Further c o n v e r g e n c e theorems for v e c t o r - v a l u e d p r a m a r t s and mils were o b t a i n e d by B e l l o w and Dvoretzky, Edgar

[54], Egghe

see B e l l o w and Egghe

[65], M i l l e t and S u c h e s t o n

[18,19], and by

[95], and Mucci

[98].

As a c o m m o n a b s t r a c t i o n of real p r a m a r t s and submartingales, M i l l e t and Sucheston

[96] also i n t r o d u c e d subpramarts.

Egghe

[67] and Slaby

[138]

214 studied

subpramarts

in a B a n a c h

real and v e c t o r - v a l u e d

lattice.

subpramarts,

There are also g e n e r a l i z a t i o n s

For a d e t a i l e d

see E g g h e

discussion

of

[68].

of amarts w h i c h

concern

the range of

these processes:

Amarts

in a F r ~ c h e t

nuclear Fr~chet

space w e r e

spaces

are c h a r a c t e r i z e d

to the c h a r a c t e r i z a t i o n Bellow

[7].

In

space,

as well

in a F r ~ c h e t

Multivalued The v a l u e s

space h a v i n g

amarts were

convex

embedding

convex [101]

sets).

Finally, respect

theorem

Earlier,

are

let us r e m a r k

that a m a r t s

set.

a rich l i t e r a t u r e

In r e c e n t years,

aspects

amarts

Dam and N g u y e n

Duy Tien

[120],

of

it follows in a

in the case of c l o s e d b o u n d e d

martingales

had b e e n

approach,

studied by N e v e u

see C o s t ~

have also b e e n g e n e r a l i z e d

interest

directed

we have c o n f i n e d integers,

the final part of this volume.

has b e e n d e v o t e d

set.

of a m a r t t h e o r y may be f o u n d

[44].

convex

From a refinement

[43].

with

ourselves

but there also

on a m a r t s w h i c h are indexed by d i f f e r e n t

increasing

are i n d e x e d b y a g e n e r a l

Fr~chet

sequential

as strong a m a r t s

to a m a r t s w h i c h are indexed by the p o s i t i v e exists

similar g i v e n by

to be c l o s e d b o u n d e d

theoretic

In these notes,

[62,63],

property.

space.

(with unit,

multivalued

spaces

in a n u c l e a r

for w e a k

[105], g i v e n by S c h m i d t

for the m e a s u r e

to the index

supposed

may be c o n s i d e r e d

cone of an A M - s p a c e

and others;

theorem

sets in a B a n a c h

In

and a strong c o n v e r g e n c e

studied by Bui Khoi

amarts

Banach

strong a m a r t s

the R a d o n - N i k o d y m

of these p r o c e s s e s

that m u l t i v a l u e d generating

decomposition

for c e r t a i n

[62,63,66].

in terms of amarts,

dimensional

as a w e a k c o n v e r g e n c e

sets or c o m p a c t R~dstr~m's

of finite

[66], a Riesz

t h e o r e m are o b t a i n e d

s t u d i e d by E g g h e

References

sets.

to a m a r t s w h i c h

to p a p e r s

in the b i b l i o g r a p h y

on these

on a m a r t s

in

A p p e n d i x

In this appendix, Banach

A Banach

A Banach

lattice

to

0

every d o w n w a r d

B a n a c h

~

is

~

l a t t i c e s

some d e f i n i t i o n s and further

and by L i n d e n s t r a u s s

(countabl~)

(countable)

lattice

decreasing

For proofs

[109]

every n o n - e m p t y

to

we recall

lattices.

by Sch a e f e r

on

and p r o p e r t i e s

details,

we refer

and T z a f r i r i

order complete

majorized

set

A c ~

directed

family

in

to

~

of specific

to the books

[91].

if

sup A

exists

for

.

is c o u n t a b l ~ o r d e r c o n t i n u o u s

is n o r m c o n v e r g e n t

.

if every

sequence

in

0 , and it is order c o n t i n u o u s

with

infimum

0

if

is n o r m c o n v e r g e n t

0 .

For a B a n a c h

lattice

(a)

~

, the f o l l o w i n g

is order

(b)

is o r d e r c o m p l e t e

are equivalent:

continuous. and e v e r y

continuous

linear f o r m on

~

is

o r d e r continuous.

(c) (d)

is c o u n t a b l y

order complete

and c o u n t a b l y

order continuous.

is c o u n t a b l y

order complete

and no B a n a c h

sublattice

is v e c t o r

lattice

isomorphic

(e)

Under

evaluation,

(f)

Every

order bounded

~

to

1~

is i s o m o r p h i c increasing

of

. to an ideal

sequence

in

~

in

~"

.

is n o r m

convergent. (g)

Every order

A Banach

lattice

isomorphic Every

~

interval

in

has p r o p e r t y

~

lattice h a v i n g

compact.

(P) if it is, u n d e r evaluation,

to the range of a p o s i t i v e

Banach

is w e a k l y

property

contractive

projection

(P) is o r d e r complete.

in

~"

.

216

A Banach

lattice

is a K B - s p a c e

For a Banach

lattice

(a)

~

is a KB-space.

~

(b)

~

is o r d e r c o n t i n u o u s

if it is w e a k l y

, the f o l l o w i n g

(c)

No Banach

(d)

Under evaluation,

sublattice

(c)

Every norm bounded

~

complete.

are e q u i v a l e n t :

and has p r o p e r t y

of

~

sequentially

is v e c t o r

is isomorphic

increasing

(P).

lattice

isomorphic

to a b a n d

sequence

in

in

~

~"

to

c

o

.

is n o r m

convergent. Every B a n a c h

lattice h a v i n g

in particular, Furthermore,

every

is r e f l e x i v e isomorphic

A Banach li x + y

reflexive

a KB-space

is or d e r dentable,

see G h o u s s o u b

~

is a KB-space. property

and T a l a g r a n d

if no B a n a c h

is an A L - s p a c e

II x II + II y il

holds

For a B a n a c h

lattice

(a)

is i s o m o r p h i c

~

lattice

is a KB-space;

if and only if it

[78], and a K B - s p a c e

sublattice

of

~

is v e c t o r

lattice

11

lattice

II =

Banach

property

has the R a d o n - N i k o d y m

if and only

to

the R a d o n - N i k o d y m

~

if the identity

for all

x, y 6 ~ +

, the f o l l o w i n g

are e q u i v a l e n t

(as a t o p o l o g i c a l

vector

(Schlotterbeck) :

lattice)

to an

AL-space. (b)

Every positive

Every A L - s p a c e (Q,Z,~)

to

s e q u e n ce LI(Q,Z,~)

in

~

is a b s o l u t e l y

, for some m e a s u r e

summable.

space

(Kakutani).

Furthermore,

every A L - s p a c e

Radon-Nikodym

property

for some index

set

A Banach

lattice

II =

contains

~

is an A M - s p a c e holds

an A L - s p a c e

to

has the II(F)

is r e f l e x i v e

, if and

(with unit)

for all

x, y 6 2 +

if the identity (and the unit ball

element).

For a B a n a c h

lattice

(a)

is isomorphic

~

and an A L - s p a c e

if it is i s o m o r p h i c

dimension.

11 x il v li y II

a largest

is a KB-space,

if and only

F ; in p a r t i c u l a r ,

only if it has finite

li x v y

summable

is isomorphic

~

, the f o l l o w i n g

are e q u i v a l e n t

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to

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Sci. Paris S~rie A 289, 75-78

(1979).

Schmidt:

Sur la c o n v e r g e n c e d'une a m a r t i n g a l e born~e et un t h ~ o r ~ m e de Chatterji. C.R. Acad.

[114]

Sci. Paris S~rie A 289,

181-183

(1979).

K.D. Schmidt: On the value of a stopped set f u n c t i o n process. J. M u l t i v a r i a t e Anal.

[1,15]

I_~0, 123-134

(1980).

K.D. Schmidt: T h ~ o r ~ m e s de structure pour les a m a r t i n g a l e s en p r o c e s s u s de fonctions d ' e n s e m b l e s ~ v a l e u r s dans un espace de Banach. C.R. Acad.

[116]

K.D.

Sci. Paris S~rie A 290,

1069-1072

(1980).

Schmidt:

T h ~ o r ~ m e s de c o n v e r g e n c e pour les a m a r t i n g a l e s en p r o c e s s u s de fonctions d ' e n s e m b l e s ~ v a l e u r s dans un espace de Banach° C.R. Acad.

[1t7]

Sci. Paris S~rie A 290,

1103-1106

(1980).

K.D. Schmidt: On the c o n v e r g e n c e of a b o u n d e d amart and a c o n j e c t u r e of Chatterji. J. M u l t i v a r i a t e Anal.

I!I, 58-68

(1981).

230

[118]

K.D. Schmidt: Generalized martingales and set function processes. In: Methods of Operations Research, vol. 44, pp. 167-178. K6nigstein:

[119]

Atheneum 1981.

K.D. Schmidt: On the Jordan decomposition for vector measures. In: Probability in Banach Spaces IV. Lecture Notes in Mathematics, Berlin-Heidelberg-New

[120]

vol. 990, pp. 198-203.

York: Springer 1983.

K.D. Schmidt: On R~dstr~m's embedding theorem. In: Methods of Operations Research,

vol. 46, pp. 335-338.

K6nigstein: Atheneum 1983.

[121]

J.L. Snell: Applications of martingale system theorems. Trans. Amer. Math. Soc. 73, 293-312

[122]

(1952).

C. Stricker: Quasimartingales,

martingales

locales,

semimartingales et

filtration naturelle. Z. Wahrscheinlichkeitstheorie [123]

(1977).

L. Sucheston: Les amarts

(martingales asymptotiques).

In: S~minaire Mauray-Schwartz Palaiseau: [124]

verw. Gebiete 39, 55-63

1975-1976, Expos~ no. VIII, 6 p.

Ecole Polytechnique,

Centre de Math~matiques,

1976.

J. Szulga: On the submartingale characterization of Banach lattices isomorphic to 11 . Bull. Acad. Polon. 65-68

[125]

Sci. S~rie Sci. Math. Astronom.

Phys. 26,

(1978).

J. Szulga: Boundedness and convergence of Banach lattice valued submartingales. In: Probability Theory on Vector Spaces. Lecture Notes in Mathematics, vol. 656, pp. 251-256. Berlin-Heidelberg-New

York: Springer 1978.

231 [126]

J.

Szulga:

Regularity of Banach lattice valued martingales. Colloquium Math. 41, 303-312 [127]

(1979).

J. Szulga and W.A. Woyczynski: Convergence of submartingales Ann. Probability 4, 464-469

[128]

in Banach lattices.

(1976).

J.J. Uhl jr.: Martingales of vector valued set functions. Pacific J. Math. 30, 533-548

[129]

(1969).

J.J. Uhl jr.: Pettis mean convergence of vector-valued asymptotic martingales. Z. Wahrscheinlichkeitstheorie

[130]

verw. Gebiete 37, 291-295

(1977).

M.A. Woodbury: A decomposition theorem for finitely additive set functions. Bull. Amer. Math. Soc. 56,

[131]

171-172

(1950).

M. Yamasaki: Another convergence theorem for martingales TShoku Math. J. 33, 555-559

[132]

in the limit.

(1981).

C. Yoeurp: Compl~ments sur les temps locaux et les quasi-martingales. Ast~risque 52-53,

[133]

197-218

(1978).

K. Yosida: Vector lattices and additive set functions. Proc. Imp. Acad. Tokyo 17, 228-232

[134]

(1941).

K. Yosida and E. Hewitt: Finitely additive measures. Trans. Amer. Math. Soc. 72, 46-66

(1952).

2~

Additional [135]

references: L.H.

Blake:

A generalization of martingales and two consequent convergence theorems. Pacific J. Math. [136]

35, 279-283

(1970).

D.I. Cartwright: The order completeness of some spaces of vector-valued functions. Bull. Austral. Math. Soc. I!, 57-61

[137]

(1974).

M. Slaby: Convergence of submartingales and amarts in Banach lattices. Bull. Acad. Polon. Sci. S~rie Sci. Math.

[138]

30, 291-299

(1982).

M. Slaby: Convergence of positive subpramarts and pramarts in Banach spaces with unconditional bases. Bull. Pol. Acad. Sci. Math.

3_!1, 75-80

(1983).

I n d e x

.

absolutely additive

summing set

function

AL-space

216

AM-space

216

amart amart

operator

129

62,

125

89 in p r o b a b i l i t y

asymptotic

bounded

212

martingale

89

set

function

62,

bounded

set

function

process

bounded

stopping

cone

absolutely

time

theorem: 103

2.5

14.

-

amart

2.3

9.

-

martingale

80

3.3

9.

-

martingale

144

72

60

summing

convergence

125

operator

4.6

9.

-

order

amart

4.7

I.

-

order

potential

4.6

12.

-

positive

4.3

6.

-

positive

submartingale

4.5

5.

-

positive

weak

2.5

13.

-

potential

3.6

9.

-

strong

3.5

12.

-

uniform

3.5

11.

-

uniform

potential

3.6

8.

-

uniform

weak

204 208

hypomartingale

182

potential

102

amart

163

amart

155

amart

206

154 162

197

128

2S4

3.6.7.

-

u n i f o r m weak p o t e n t i a l

4.5.2.

-

weak a m a r t

3.6.11.

-

weak

196

sequential

amart

additive

measure,

countably

order complete

countably

order continuous

difference amart

4.6.2.

-

order a m a r t

Banach

lattice

Banach

-

semiamart

-

strong a m a r t

-

uniform amart

145 149 190

Doob p o t e n t i a l

82,

enveloppe

179

de Snell:

semiamart

107-108

game w h i c h b e c o m e s

fairer w i t h time

generalized

Radon-Nikodym

derivative

generalized

Radon-Nikodym

operator

hypomartingale

205

decomposition

207

KB-space

216

Krickeberg

decomposition

190

decomposition:

2.3.6.

-

martingale

77

3.3.6.

-

martingale

143

2.1.4

-

measure

3.1 .9.

-

vector measure

64

limit measure

martingale martingale maximal

215

106

Doob c o n d i t i o n

Lebesgue

215

lattice

200-201

2.6.2.

Jordan

65,

94

3.4.3.

-

vector measure

property:

-

2.6.3.

164

countably

2.5.5.

3.5.1.

162

75,

74,

133 142

142

in the l i m i t

212

ingquality:

2.5.12.

-

set f u n c t i o n

process

101

3.5.10.

-

set f u n c t i o n

process

154

213 68, 68,

134

134

133

2S5

measure mil

62

212

~-bounded ~-norm

o-lim

71, 137

set f u n c t i o n process 72

200

o p t i o n a ~ sampling theorem: 2.7.3.

amart

-

117

o p t i o n a l s t o p p i n g theorem: 2.7.2.

amart

-

115

order amart

200

o r d e r b o u n d e d set function

169 215

o r d e r c o m p l e t e B a n a c h lattice

215

order c o n t i n u o u s B a n a c h lattice order p o t e n t i a l

partition

203

59

p o s i t i v e set function potential pramart property

169

95 212 (P)

215

p u r e l y f i n i t e l y a d d i t i v e measure,

quasimartingale

84,

155

Radon-Nikodym operator regular o p e r a t o r

67, 134

170

r e p r e s e n t i n g linear o p e r a t o r restriction

127

70, 137

r e s t r i c t i o n map

70, 137

Riesz decomposition: 2.5.8.

-

amart

4.3.11.

-

negative submartingale

4.6.7.

-

order a m a r t

4.6.10.

-

positive hypomartingale

4.3.4.

-

positive submartingale

2.4.7.

-

quasimartingale

85

2.7.1.

-

quasimartingale

114

2.6.6.

-

semiamart

3.4.4.

-

strong amart

2.4.2.

-

submartingale

96 186

203

110 146 82

205 180

vector m e a s u r e

112, 165

236

4.3.15.

-

submartingale

2.4.2.

-

supermartingale

3.5.3.

-

uniform amart

3.6.6.

-

u n i f o r m weak a m a r t

semiamart

71,

simple

stopping

process

basis

basis

145 146 81,

supermartingale

179

81,

179

set f u n c t i o n

process

71,

137

72

topological

orthogonal

stochastic

uniform amart

u n i f o r m weak

system

basis

60

150

amart

157

u n i f o r m weak p o t e n t i a l

160

uniformly

l-continuous

universal

vector measure

variation

197

149

uniform potential

martingale

77,

143

59

127

vector measure

w-lim

60

59

potential

submartingale

trivial

136

60

strong a m a r t

T-norm

69,

59

time

T-bounded

160-161

126

stochastic

stochastic

strong

150

function

standard

82

137

semivariation set f u n c t i o n

188

125

157

weak

amart

weak

potential

157

weak

sequential

Yosida-Hewitt

~-continuous ~-singular

196 amart

163

decomposition

measure,

measure,

112,

165

vector measure

vector measure

64, 64,

132

132

Allan

Gut

A m a r t s

a

and

Klaus

D.

Schmidt:

-

b i b l i o g r a p h y

239

Amart theory has rapidly grown since its "foundation" J.R. Baxter

[I], R.V. Chacon

A. Ionescu Tulcea

[I], and D.G. Austin,

[I]. The principal

in 1974 by

G.A. Edgar,

and

purpose of the present b i b l i o g r a p h y

is to list the literature on amarts.

It also contains papers which led

to or were inspired by amart theory,

as well as a small number of papers

concerning

further generalizations

of m a r t i n g a l e s

whose relation to

amarts may be subject to further research.

K.A. Astbur[ [I]

Amarts

indexed by directed

sets.

Ann. P r o b a b i l i t y 6, 267-278 [2]

Order convergence

(1978).

of m a r t i n g a l e s

in terms of countably

additive and purely finitely additive martingales. Ann. P r o b a b i l i t y 9, 266-275 [3]

The order convergence

(1981).

of m a r t i n g a l e s

indexed by directed

sets. Trans. Amer.

D.G. Austin, [I]

Math.

G.A. Ed@ar,

Soc.

265, 495-510

(1981).

and A. Ionescu Tulcea

Pointwise c o n v e r g e n c e

in terms of expectations.

Z. W a h r s c h e i n l i c h k e i t s t h e o r i e

verw. Gebiete 3_~0, 17-26

J.R. Baxter [I]

[2]

Pointwise

in terms of weak convergence.

Proc. Amer.

Math.

Convergence

of stopped random variables.

Adv. Math.

Soc.

2!, 112-115

46, 395-398

(1974).

(1976).

A. Bellow

[i]

On v e c t o r - v a l u e d

asymptotic

Proc. Nat. Acad.

Sci. U.S.A.

martingales. 7_~3, 1798-1799

(1976).

(1974).

240 [2]

Stability properties of the class of asymptotic martingales. Bull. Amer. Math. Soc. 82, 338-340

[3]

(1976).

Several stability properties of the class of asymptotic martingales. z. Wahrscheinlichkeitstheorie

[4]

verw. Gebiete 37, 275-290

Les amarts uniformes. C.R. Acad. Sci. Paris S~rie A 284,

[5]

(1977).

1295-1298

(1977).

Uniform amarts: A class of asymptotic martingales for which strong almost sure convergence obtains. Z. Wahrscheinlichkeitstheorie

[6]

verw. Gebiete 41, 177-191

(1978).

Some aspects of the theory of vector-valued amarts. In: Vector Space Measures and Applications I. Lecture Notes in Mathematics,

vol. 644, pp. 57-67.

Berlin - H e i d e l b e r g - New York: Springer 1978. [7]

Submartingale characterization of measurable cluster points. In: Probability on Banach Spaces. Advances in Probability and Related Topics, vol. 4, pp. 69-80. New Y o r k - B a s e l :

[8]

Dekker 1978.

Sufficiently rich sets of stopping times, measurable cluster points and submartingales. In: S~minaire Mauray-Schwartz

1977-1978,

S~minaire sur la

G~omAtrie des Espaces de Banach, Appendice no. 1, 11 p. Palaiseau: [9]

Ecole Polytechnique,

Martingales,

Centre de Math~matiques,

amarts and related stopping time techniques.

In: Probability in Banach spaces III. Lecture Notes in Mathematics,

vol. 860, pp. 9-24.

Berlin - H e i d e l b e r g - New York: Springer 1981.

A. Bellow and A. Dvoretzk~

[1]

A characterization of almost sure convergence. In: Probability in Banach Spaces II. Lecture Notes in Mathematics,

vol. 709, pp. 45-65.

Berlin - H e i d e l b e r g - N e w York: Springer 1979.

1978.

241

[2]

On m a r t i n g a l e s

in the limit.

Ann. Probability 8, 602-606

(1980).

A. Bellow and L. Egghe

[1]

[2]

In~galit~s

de Fatou g~n~ralis~es.

C.R. Acad.

Sci. Paris S~rie I 292, 847-850

Generalized Ann.

Y. Ben[amini [I]

(1981).

Fatou inequalities.

Inst. H. Poincar~

Section B I-8, 335-365

(1982).

and N. Ghoussoub

Une c a r a c t ~ r i s a t i o n C.R. Acad.

probabiliste

de 11 .

Sci. Paris S~rie A 286,

795-797

(1978).

L.H. Blake

[1]

A generalization

of martingales

and two consequent

convergence

theorems. Pacific J. Math. [2]

3_~5, 279-283

A note concerning

(1970).

the L l - c o n v e r g e n c e

of a class of games which

become fairer with time. G l a s g o w Math. J. [3]

1_~3, 39-41

Further results concerning

(1972). games which become

fairer with

time. J. London Math. [4]

Soc.

A note concerning

(2) 6, 311-316

(1973).

first order games which become fairer with

time. J. London Math.

[5]

(2) 9, 589-592

Every amart is a m a r t i n g a l e J. London Math.

[6]

Soc.

Soc.

Weak submartingales J. London Math.

Soc.

(1975).

in the limit.

(2) 18, 381-384

(1978).

in the limit. (2) I_~9, 573-575

(1979).

242

[7]

C o n v e r g e n t processes, martingale

projective

Glasgow Math. J. 20, 119-124

[8]

systems of measures

and

decompositions. (1979).

T e m p e r e d processes and a Riesz d e c o m p o s i t i o n martingales

for some

in the limit.

G l a s g o w Math.

J. 22, 9-17

(1981).

B. Bru and H. Heinich

[1]

Sur l'esp&rance C.R. Acad.

[2]

Sci. Paris S&rie A 288, 65-68

vectorielles. (1979).

adapt&es.

Sci. Paris S&rie A 288, 363-366

Sur l'esp~rance Ann.

[4]

al&atoires

Sur les suites de mesures v e c t o r i e l l e s C.R. Acad.

[3]

des variables

des variables

Inst. H. Poincar&

Sur l'esp&rance

al&atoires

(1979).

vectorielles.

Section B I-6, 177-196

des variables

al&atoires

(1980).

~ valeurs dans les

espaces de Banach r&ticul&s. Ann.

Inst. H. Poincar~

B. Bru, H. Heinich, [I]

Section B 16, 197-210

(1980).

and J.C. L o o t ~ i e t e r

Lois des grands nombres pour les variables &changeables. C.R. Acad.

Sci. Paris S&rie I 293,

485-488

(1981).

A . Brunel and U. Krengel

[1]

Parier avec un proph~te dans le cas d'un processus sous-additif. C.R. Acad.

Sci. Paris S&rie A 288, 57-60

(1979).

A. Brunel and L. Sucheston [I]

Sur les amarts faibles ~ valeurs vectorielles. C.R. Acad.

Sci. Paris S~rie A 282,

1011-1014

(1976).

243

[2]

Sur les amarts ~ valeurs vectorielles. C.R. Acad. Sci. Paris S~rie A 283, 1037-1040

[3]

(1976).

Une caract~risation probabiliste de la s~parabilit~ du dual d'un espace de Banach. C.R. Acad. Sci. Paris S~rie A 284, 1469-1472

(1977).

R.V. Chacon [I]

A "stopped" proof of convergence. Adv. Math. 14, 365-368

(1974).

R.V. Chacon and L. Sucheston [1]

On convergence of vector-valued asymptotic martingales. Z. Wahrscheinlichkeitstheorie

verw. Gebiete 33, 55-59

(1975).

S.D. Chatterji

[1]

Differentiation along algebras. Manuscripta Math. 4, 213-224

[2]

(1971).

Les martingales et leurs applications analytiques. In: Ecole d'Et~ de Probabilit~s: Lecture Notes in Mathematics, Berlin-Heidelberg-New

[3]

Processus Stochastiques.

vol. 307, pp. 27-164.

York: Springer 1973.

Differentiation of measures. In: Measure Theory, Oberwolfach Lecture Notes in Mathematics, Berlin-Heidelberg-New

1975.

vol. 541, pp. 173-179.

York: Springer 1976.

R. Chen

[1]

A generalization of a theorem of Chacon. Pacific J. Math. 64, 93-95

(1976).

244

[2]

A simple proof of a theorem of Chacon Proc. Amer. Math. Soc. 60, 273-275

[3]

(1976).

Some inequalities for randomly stopped variables with applications to pointwise convergence. Z. Wahrscheinlichkeitstheorie

verw. Gebiete 36, 75-83

(1976).

B.D. Choi

[1]

The RieSz decomposition of vector-valued uniform amarts for continuous parameter. Kyungpook Math. J. 18,

119-123

(1978).

B.D. Choi and L. Sucheston

[1]

Continuous parameter uniform amarts. In: Probability in Banach Spaces III. Lecture Notes in Mathematics, vol. 860, pp. 85-98. B e r l i n - Heidelberg - N e w York: Springer 1981.

Y.S. Chow

[1]

On the expected value of a stopped submartingale. Ann. Math. Statist. 38, 608-609

(1967).

B.K. Dam and N.D. Tien [I]

On the multivalued asymptotic martingales. Acta Math. Vietnam. 6, 77-87

W.J. Davis, N. Ghoussoub,

[1]

(1981).

and J. Lindenstrauss

A lattice renorming theorem and applications to vector-valued processes. Trans. Amer. Math. Soc. 263, 531-540

(1981}.

245

W.J. Davis and W.B. Johnson

[1]

Weakly c o n v e r g e n t

sequences of Banach space valued random

variables. In: Banach Spaces of Analytic

Functions.

Lecture Notes in Mathematics,

vol. 604, pp.

Berlin - H e i d e l b e r g - N e w

Springer

York:

29-31.

1977.

L.E. Dubins and D.A. F r e e d m a n [I]

On the expected value of a stopped martingale. Ann. Math.

A. Dvoretzky

[1]

Statist.

[1]

Generalizations

(see also:

Soc. 82, 347-349

of martingales.

P r o b a b i l i t y 2, 193-194

(1977).

D.G. Austin)

Inst. H. Poincar~

A s p l u n d operators

Section B 15,

Additive

197-203

(1979).

and a.e. convergence.

J. M u l t i v a r i a t e Anal. 10, 460-466 [3]

(1976).

U n i f o r m semiamarts. Ann.

[2]

(1966).

On stopping time directed convergence.

Adv. AppI.

G.A. Edgar

1505-1509

(see also: A. Bellow)

Bull. Amer. Math.

[2]

37,

(1980).

amarts.

Ann. P r o b a b i l i t y 10,

199-206

(1982).

G.A. Edgar and L. Sucheston [I]

Les amarts: C.R. Acad.

Une classe de m a r t i n g a l e s

asymptotiques.

Sci. Paris S~rie A 282, 715-718

(1976).

246

[2]

Amarts:

A class of asymptotic martingales.

A. Discrete

parameter. J. M u l t i v a r i a t e Anal. 6,

[3]

Amarts:

193-221

A class of a s y m p t o t i c

(1976).

martingales.

B. Continuous

parameter. J. M u l t i v a r i a t e Anal. 6, 572-591 [4]

The Riesz d e c o m p o s i t i o n Bull. Amer. Math.

[5]

Soc.

for v e c t o r - v a l u e d 82, 632-634

The Riesz d e c o m p o s i t i o n

On v e c t o r - v a l u e d

[8]

[I]

in the limit and amarts. 315-320

39, 213-216

(1977).

(1977).

de lois des grands nombres par les

Caract~risations

descendantes.

de la nucl~arit~

(1981).

of n u c l e a r i t y

Anal. 35, 207-214

Some new C h a c o n - E d g a r - t y p e Ann.

A new c h a r a c t e r i z a t i o n in L(LI,X)

Simon Stevin 54,

(1978).

in Fr~chet spaces. (1980).

inequalities

and characterizations

Inst. H. Poincar~

operator

dans les espaces de Fr~chet.

Sci. Paris S~rie A 287, 9-11

Characterizations

processes,

[4]

Soc. 67,

Sci. Paris S~rie I 292, 967-969

J. Functional [3]

(1976).

(see also: A. Bellow)

C.R. Acad.

[2]

Gebiete

Math.

C.R. Acad.

Egghe

verw.

Proc. Amer.

sous-martingales

L.

verw. Gebiete 36, 85-92

Martingales

D~monstrations

amarts.

amarts and dimension of Banach spaces.

Z. W a h r s c h e i n l i c h k e i t s t h e o r i e [7]

amarts.

(1976).

for v e c t o r - v a l u e d

Z. W a h r s c h e i n l i c h k e i t s t h e o r i e

[6]

(1976).

for stochastic

of Vitali-conditions.

Section B 16, 327-337

(1980).

of Banach spaces X for which every

is c o m p l e t e l y continuous.

135-149

(1980).

247

[5]

Strong c o n v e r g e n c e of p r a m a r t s in B a n a c h spaces. C a n a d i a n J. Math. 33, 357-361

[6]

(1981).

W e a k and strong c o n v e r g e n c e of amarts in F r ~ c h e t spaces. J. M u l t i v a r i a t e Anal. 12, 291-305

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