Stable fluctuations of iterated perturbed random walks in intermediate generations of a general branching process tree

Abstract

Consider a general branching process, a.k.a. Crump-Mode-Jagers process, generated by a perturbed random walk η1, 1+η2, 1+2+η3,…. Here, (1,η1), (2, η2),… are independent identically distributed random vectors with arbitrarily dependent positive components. Denote by Nj(t) the number of the jth generation individuals with birth times ≤ t. Assume that j=j(t)∞ and j(t)=o(ta) as t∞ for some explicitly given a>0 (to be specified in the paper). The corresponding jth generation belongs to the set of intermediate generations. We provide sufficient conditions under which finite-dimensional distributions of the process (N j(t)u(t))u>0, properly normalized and centered, converge weakly to those of an integral functional of a stable L\'evy process with finite mean.