The growth of the Green function for random walks and Poincar\'e series

Abstract

Given a probability measure μ on a finitely generated group , the Green function G(x,y|r) encodes many properties of the random walk associated with μ. Finding asymptotics of G(x,y|r) as y goes to infinity is a common thread in probability theory and is usually referred as renewal theory in literature. Endowing with a word distance, we denote by Hr(n) the sum of the Green function G(e,x|r) along the sphere of radius n. This quantity appears naturally when studying asymptotic properties of branching random walks driven by μ on and the behavior of Hr(n) as n goes to infinity is intimately related to renewal theory. Our motivation in this paper is to construct various examples of particular behaviors for Hr(n). First, our main result exhibits a class of relatively hyperbolic groups with convergent Poincar\'e series generated by Hr(n), which answers some questions raised in a previous paper of the authors. Along the way, we investigate the behavior of Hr(n) for several classes of finitely generated groups, including abelian groups, certain nilpotent groups, lamplighter groups, and Cartesian products of free groups.