Reducibility of self-adjoint linear relations and application to generalized Nevanlinna functions

Abstract

Necessary and sufficient conditions for reducidibility of a self-adjoint linear relation in a Krein space are given. Then a generalized Nevanlinna function Q, represented by a self-adjoint linear relation A, is decomposed by means of the reducing subspaces of A. The sum of two functions Qi∈ N_i( H ), i=1, 2, minimally represented by the triplets ( Ki,Ai,i ), is also studied. For that purpose, a model ( K,A, ) to represent Q:=Q1+Q2 in terms of ( Ki,Ai,i ) is created. By means of that model, necessary and sufficient conditions for =1+2 are proven in analytic terms. At the end, it is explained how degenerate Jordan chains of the representing relation A affect reducing subspaces of A and decomposition of the corresponding function Q.