Upper deviation probabilities for level sets of a supercritical branching random walk

Abstract

Given a supercritical branching random walk \Zn\n≥ 0 on R, let Zn([y,∞)) be the number of particles located in [y,∞)⊂R at generation n. Let m be the mean of the offspring law of \Zn\n≥ 0 and I(x) be the large deviation rate function of the underlying random walk of \Zn\n≥ 0. It is known from [6] that under some mild conditions, for x∈(0,x*), n-1 Zn([nx,∞)) converges almost surely to m- I(x) on the event of nonextinction as n∞, where x* is the speed of maximal position of the branching random walk. In this work, we investigate its upper deviation probabilities, in other words, the convergence rates of \[P(Zn([xn,∞))≥ ean)\] as n∞, where x>0 and a>( m- I(x))+. This paper is a counterpart work of the lower deviation probabilities [28] and also completes those results in [1] for the branching Brownian motion.