Uniformity of hitting times of the contact process

Abstract

For the supercritical contact process on the hyper-cubic lattice started from a single infection at the origin and conditioned on survival, we establish two uniformity results for the hitting times t(x), defined for each site x as the first time at which it becomes infected. First, the family of random variables (t(x)-t(y))/|x-y|, indexed by x ≠ y in Zd, is stochastically tight. Second, for each >0 there exists x such that, for infinitely many integers n, t(nx) < t((n+1)x) with probability larger than 1-. A key ingredient in our proofs is a tightness result concerning the essential hitting times of the supercritical contact process introduced by Garet and Marchand (Ann.\ Appl.\ Probab., 2012).