Random walk on barely supercritical branching random walk

Abstract

Let T be a supercritical Galton-Watson tree with a bounded offspring distribution that has mean μ >1, conditioned to survive. Let T be a random embedding of T into Zd according to a simple random walk step distribution. Let Tp be percolation on T with parameter p, and let pc = μ-1 be the critical percolation parameter. We consider a random walk (Xn)n 1 on Tp and investigate the behavior of the embedded process Tp(Xn) as n ∞ and simultaneously, Tp becomes critical, that is, p=pn pc. We show that when we scale time by n/(pn-pc)3 and space by (pn-pc)/n, the process (Tp(Xn))n 1 converges to a d-dimensional Brownian motion. We argue that this scaling can be seen as an interpolation between the scaling of random walk on a static random tree and the anomalous scaling of processes in critical random environments.