8.4.
OPERATOR-VALUED BOUNDED ANALYTIC FUNCTIONS~
Let ~ mapping
~
i~ *
be two Hilbert spaces and ~
be the space of ...
5 downloads
527 Views
38KB Size
Report
This content was uploaded by our users and we assume good faith they have the permission to share this book. If you own the copyright to this book and it is wrongfully on our website, we offer a simple DMCA procedure to remove your content from our site. Start by pressing the button below!
Report copyright / DMCA form
8.4.
OPERATOR-VALUED BOUNDED ANALYTIC FUNCTIONS~
Let ~ mapping
~
i~ *
be two Hilbert spaces and ~
be the space of all bounded linear operators
into ~* . The following was proved in [I].
THEOREM. Suppose 0 is a bounded ~(~,~)*) -valued function analytic in the unit disc The following assertions are equivalent: (a) there exists a bounded ~ ( ~ )
-valued function ~ analytic in ~
,['],(~)O(~)=l~ [~e~)
and satisfying
(1)
;
(b) the Kernel function Ks:
is positive definite, i.e., (2) for anyfinitesystems {%l,...,Xn}, {dl, .... an} , where
~
, dj~O
Condition (I) obviously implies that
lec~)&i~slgl (j~l~4),
(3)
The question is whether (3) implies (2) with the same s or at least with some, possibly different, positive constant. In the special case when dim ~=~ and a l m ~ the equivalence of (I) and (3), and thus the equivalence of (2) and (3), follows from the Corona theorem of Carleson (cf. [2]). A proof of the equivalence of (2) and (3) in the general case, and possibly with operator theoretic arguments, would be an important achievement. LITERATURE CITED 1 9
2 ~.
B. Sz.-Nagy and C. Foia~, "On contractions similar to isometries and Toeplitz operators," Ann. Acad. Sci. Fenn., Ser. AI: Math. Phys., No. 2, 553-564 (1976). W. Arveson, "Interpolation problems in nest algebras," J. Funct. Anal., 20, 208-233 (1:925).
~B. SZOKEFALVI-NAGY. Hungary.
2154
Bolyai Institute of Mathematics, 6720 Szeged Aradi V~rtanuk tere I,