The critical random barrier for the survival of branching random walk with absorption

Abstract

We study a branching random walk on with an absorbing barrier. The position of the barrier depends on the generation. In each generation, only the individuals born below the barrier survive and reproduce. Given a reproduction law, Biggins et al. BLSW91 determined whether a linear barrier allows the process to survive. In this paper, we refine their result: in the boundary case in which the speed of the barrier matches the speed of the minimal position of a particle in a given generation, we add a second order term a n1/3 to the position of the barrier for the nth generation and find an explicit critical value ac such that the process dies when aac. We also obtain the rate of extinction when a < ac and a lower bound on the surviving population when a > ac.