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Journal of Operator Theory

Volume 37, Issue 2, Spring 1997  pp. 201-222.

A description of commutative symmetric operator algebras in a Pontryagin space $\Pi_1$

Authors: Oleg Ya. Bendersky (1), Semyon N. Litvinov (2) and Vladimir I. Chilin (3)
Author institution:(1) Department of Mathematics, Tashkent State University, Vuzgorodok, 700095 Tashkent, UZBEKISTAN, CIS. Current address: Misholdardar 6/4, Eilat - 88000, ISRAEL
(2) Department of Mathematics, Tashkent State University, Vuzgorodok, 700095 Tashkent, UZBEKISTAN, CIS. Current address: Mathematics Department, Minard 300, North Dakota State University, Fargo, ND 58105, USA
(3) Department of Mathematics, Tashkent State University, Vuzgorodok, 700095 Tashkent, UZBEKISTAN, CIS


Summary: We construct a system of model commutative symmetric operator algebras (c.s.o.a.) in a Pontryagin space $\Pi_1$ such that both the weak operator and the uniform operator closures of any c.s.o.a. in $\Pi_1$ can be described in terms of the models found. We then use that representation to obtain the theorem of bicommutant for a c.s.o.a. in $\Pi_1$.

Keywords: Commutative, algebra, Pontryagin space, unitary equivalence, singular, weak topology, closure, bicommutant.


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