Large deviations for the maximum of a branching random walk with stretched exponential tails

Abstract

We prove large deviation results for the position of the rightmost particle, denoted by Mn, in a one-dimensional branching random walk in a case when Cram\'er's condition is not satisfied. More precisely we consider step size distributions with stretched exponential upper and lower tails, i.e.~both tails decay as e-|t|r for some r∈( 0,1). It is known that in this case, Mn grows as n1/r and in particular faster than linearly in n. Our main result is a large deviation principle for the laws of n-1/rMn . In the proof we use a comparison with the maximum of (a random number of) independent random walks, denoted by Mn, and we show a large deviation principle for the laws of n-1/r Mn as well.