Green's boundary relation model in a Krein space

Abstract

Given Krein and Hilbert spaces ( K,[.,.] ) and ( H, ( .,. ) ), respectively, the concept of the boundary triple =(H, 0, 1) is generalized through the abstract Green's identity for the isometric relation between Krein spaces ( K2, [ .,.]K2 ) and (H2, [ .,.]H2 ) without any conditions on \, and \, . This also means that we do not assume the existence of a closed symmetric linear relation S such that \, =S+, which is a standard assumptions in all previous research of boundary triples. The main properties of such a general Green's boundary model are proven. In the process, some useful properties of the isometric relation V between two Krein spaces X and Y are proven. Additionally, surprising properties of the unitary relation : K2 →H2 and the self-adjoint main transformation A of are discovered. Then, two statements about generalized Nevanlinna families are generalized using this Green's boundary model. Furthermore, several previously known boundary triples involving a Hilbert space K and reduction operator : K2 →H2, such as AB-generalized, B-generalized, ordinary, isometric, unitary, quasi-boundary, and S-generalized boundary triples, have been extended to a Krein space K and linear relation using the Green's boundary model approach.