Occupation Statistics of Critical Branching Random Walks in Two or Higher Dimensions

Abstract

Consider a critical nearest neighbor branching random walk on the d-dimensional integer lattice initiated by a single particle at the origin. Let Gn be the event that the branching random walk survives to generation n. We obtain limit theorems conditional on the event Gn for a variety of occupation statistics: (1) Let Vn be the maximal number of particles at a single site at time n. If the offspring distribution has finite αth moment for some integer α≥ 2, then in dimensions 3 and higher, Vn=Op(n1/α); and if the offspring distribution has an exponentially decaying tail, then Vn=Op( n) in dimensions 3 and higher, and Vn=Op(( n)2) in dimension 2. Furthermore, if the offspring distribution is non-degenerate then P(Vn≥ δ n | Gn) 1 for some δ >0. (2) Let Mn (j) be the number of multiplicity-j sites in the nth generation, that is, sites occupied by exactly j particles. In dimensions 3 and higher, the random variables Mn (j)/n converge jointly to multiples of an exponential random variable. (3) In dimension 2, the number of particles at a "typical" site (that is, at the location of a randomly chosen particle of the nth generation) is of order Op( n), and the number of occupied sites is Op(n/ n).