Lower deviation probabilities for level sets of the branching random walk

Abstract

Given a branching random walk\Zn\n≥0 on R, let Zn([y,∞)) be the number of particles located in [y,∞) at generation n. It is known from Biggins1977 that under some mild conditions, n-1 Zn([θ x* n,∞)) converges a.s. to m-I(θ x*), where m-I(θ x*) is a positive constant. In this work, we investigate its lower deviation, in other words, the convergence rates of P(Zn([θ x* n,∞))<ean), where a∈[0, m-I(θ x*)). Our results complete those in Mehmet, Helower and GWlower.