Characterization of Weyl functions in the class of operator-valued generalized Nevanlinna functions

Abstract

We provide the necessary and sufficient conditions for a generalized Nevanlinna function Q (Q∈ N ( H )) to be a Weyl function (also known as a Weyl-Titchmarch function). We also investigate an important subclass of N (H), the functions that have a boundedly invertible derivative at infinity Q'( ∞ ):= z ∞zQ(z). These functions are regular and have the operator representation Q( z )=+( A-z )-1,z∈ ( A ), where A is a bounded self-adjoint operator in a Pontryagin space K. We prove that every such strict function Q is a Weyl function associated with the symmetric operator S:=A (I-P)K, where P is the orthogonal projection, P:= ( + )-1 + . Additionally, we provide the relation matrices of the adjoint relation S+ of S, and of A, where A is the representing relation of Q:=-Q-1. We illustrate our results through examples, wherein we begin with a given function Q∈ N ( H ) and proceed to determine the closed symmetric linear relation S and the boundary triple so that Q becomes the Weyl function associated with .