On large deviation probabilities for empirical distribution of branching random walks with heavy tails

Abstract

Given a branching random walk (Zn)n≥0 on R, let Zn(A) be the number of particles located in interval A at generation n. It is well known (e.g., biggins) that under some mild conditions, Zn( nA)/Zn(R) converges a.s. to (A) as n→∞, where is the standard Gaussian measure. In this work, we investigate its large deviation probabilities under the condition that the step size or offspring law has heavy tail, i.e. the decay rate of P(Zn( nA)/Zn(R)>p) as n→∞, where p∈((A),1). Our results complete those in ChenHe and Louidor.