General solution of the Poisson equation for Quasi-Birth-and-Death processes

Abstract

We consider the Poisson equation (I-P)u=g, where P is the transition matrix of a Quasi-Birth-and-Death (QBD) process with infinitely many levels, g is a given infinite dimensional vector and u is the unknown. Our main result is to provide the general solution of this equation. To this purpose we use the block tridiagonal and block Toeplitz structure of the matrix P to obtain a set of matrix difference equations, which are solved by constructing suitable resolvent triples.