Painting a graph with competing random walks

Abstract

Let X1,X2 be independent random walks on Znd, d≥3, each starting from the uniform distribution. Initially, each site of Znd is unmarked, and, whenever Xi visits such a site, it is set irreversibly to i. The mean of |Ai|, the cardinality of the set Ai of sites painted by i, once all of Znd has been visited, is 12nd by symmetry. We prove the following conjecture due to Pemantle and Peres: for each d≥3 there exists a constant αd such that n∞Var(| Ai|)/hd(n)=14αd where h3(n)=n4, h4(n)=n4( n) and hd(n)=nd for d≥5. We will also identify αd explicitly and show that αd1 as d∞. This is a special case of a more general theorem which gives the asymptotics of Var(|Ai|) for a large class of transient, vertex transitive graphs; other examples include the hypercube and the Caley graph of the symmetric group generated by transpositions.