Critical Branching Random Walks with Small Drift

Abstract

We study critical branching random walks (BRWs) U(n) on~Z+ where for each n, the displacement of an offspring from its parent has drift~2β/n towards the origin and reflection at the origin. We prove that for any~α>1, conditional on survival to generation~[nα], the maximal displacement is asymptotically equivalent to (α-1)/(4β)n n. We further show that for a sequence of critical BRWs with such displacement distributions, if the number of initial particles grows like~ynα for some y>0 and α>1, and the particles are concentrated in~[0,O(n)], then the measure-valued processes associated with the BRWs, under suitable scaling converge to a measure-valued process, which, at any time~t>0, distributes its mass over~R+ like an exponential distribution.