On inverses of Krein's Q-functions

Abstract

Let AQ be the self-adjoint operator defined by the Q-function Q:z Qz through the Krein-like resolvent formula (-AQ+z)-1= (-A0+z)-1+GzWQz-1VG z*\,, z∈ ZQ\,, where V and W are bounded operators and ZQ:=\z∈(A0):Qz and Q z have a bounded inverse\\,. We show that ZQ= ZQ=(A0) (AQ)\,. We do not suppose that Q is represented in terms of a uniformly strict, operator-valued Nevanlinna function (equivalently, we do not assume that Q is associated to an ordinary boundary triplet), thus our result extends previously known ones. The proof relies on simple algebraic computations stemming from the first resolvent identity.