Partially fundamentally reducible operators in Krein spaces

Abstract

A self-adjoint operator A in a Krein space ( K,[\,·\,,·\,]) is called partially fundamentally reducible if there exist a fundamental decomposition K = K+ [+] K- (which does not reduce A) and densely defined symmetric operators S+ and S- in the Hilbert spaces ( K+,[\,·\,,·\,]) and ( K-,-[\,·\,,·\,]), respectively, such that each S+ and S- has defect numbers (1,1) and the operator A is a self-adjoint extension of S =S+ (-S-) in the Krein space ( K,[\,·\,,·\,]). The operator A is interpreted as a coupling of operators S+ and -S- relative to some boundary triples ( C,0+,1+) and ( C,0-,1-). Sufficient conditions for a nonnegative partially fundamentally reducible operator A to be similar to a self-adjoint operator in a Hilbert space are given in terms of the Weyl functions m+ and m- of S+ and S- relative to the boundary triples ( C,0+,1+) and ( C,0-,1-). Moreover, it is shown that under some asymptotic assumptions on m+ and m- all positive self-adjoint extensions of the operator S are similar to self-adjoint operators in a Hilbert space.