Lower deviation and moderate deviation probabilities for maximum of a branching random walk

Abstract

Given a super-critical branching random walk on R started from the origin, let Mn be the maximal position of individuals at the n-th generation. Under some mild conditions, it is known from A13 that as n→∞, Mn-x*n+32θ* n converges in law for some suitable constants x* and θ*. In this work, we investigate its moderate deviation, in other words, the convergence rates of P(Mn≤ x*n-32θ* n-n), for any positive sequence (n) such that n=O(n) and n∞. As a by-product, we also obtain lower deviation of Mn; i.e., the convergence rate of \[ P(Mn≤ xn), \] for x<x* in B\"ottcher case where the offspring number is at least two. Finally, we apply our techniques to study the small ball probability of limit of derivative martingale.