Necessary and sufficient conditions for the convergence of the consistent maximal displacement of the branching random walk

Abstract

Consider a supercritical branching random walk on the real line. The consistent maximal displacement is the smallest of the distances between the trajectories followed by individuals at the nth generation and the boundary of the process. Fang and Zeitouni, and Faraud, Hu and Shi proved that under some integrability conditions, the consistent maximal displacement grows almost surely at rate λ* n1/3 for some explicit constant λ*. We obtain here a necessary and sufficient condition for this asymptotic behaviour to hold.