Renewal theory for iterated perturbed random walks on a general branching process tree: intermediate generations

Abstract

Let (k,ηk)k∈N be independent identically distributed random vectors with arbitrarily dependent positive components. We call a (globally) perturbed random walk a random sequence (Tk)k∈N defined by Tk:=1+·s+k-1+ηk for k∈N. Further, by an iterated perturbed random walk is meant the sequence of point processes defining the birth times of individuals in subsequent generations of a general branching process provided that the birth times of the first generation individuals are given by a perturbed random walk. For j∈N and t≥ 0, denote by Nj(t) the number of the jth generation individuals with birth times ≤ t. In this article we prove counterparts of the classical renewal-theoretic results (the elementary renewal theorem, Blackwell's theorem and the key renewal theorem) for Nj(t) under the assumption that j=j(t)∞ and j(t)=o(t2/3) as t∞. According to our terminology, such generations form a subset of the set of intermediate generations.