Cover time for branching random walks on regular trees

Abstract

Let T be the regular tree in which every vertex has exactly d 3 neighbours. Run a branching random walk on T, in which at each time step every particle gives birth to a random number of children with mean d and finite variance, and each of these children moves independently to a uniformly chosen neighbour of its parent. We show that, starting with one particle at some vertex 0 and conditionally on survival of the process, the time it takes for every vertex within distance r of 0 to be hit by a particle of the branching random walk is almost surely r + 2(3/2) r + o( r).