TITLE:
Factorization of Operators in Krein Spaces and Linear-Fractional Relations of Operator Balls
AUTHORS:
Victor Anatoly Khatskevich, Valery Anatoly Senderov
KEYWORDS:
Krein Space; Linear Fractional Relation; Plus-Operator; Factorization
JOURNAL NAME:
Advances in Pure Mathematics,
Vol.3 No.1,
January
23,
2013
ABSTRACT:
We consider plus-operators in Krein spaces and generated operator linear fractional relations of the following form:
.
We study some special type of factorization for plus-operators T, among them the following one: T = BU, where B is a lower triangular plus-operator, U is a J-unitary operator. We apply the above factorization to the study of basical properties of relations (1), in particular, convexity and compactness of their images with respect to the weak operator topology. Obtained results we apply to the known Koenigs embedding problem, the Krein-Phillips problem of existing of invariant semidefinite subspaces for some families of plus-operators and to some other fields.