Improved asymptotic estimates for the contact process with stirring

Abstract

We study the contact process with stirring on Zd. In this process, particles occupy vertices of Zd; each particle dies with rate 1 and generates a new particle at a randomly chosen neighboring vertex with rate λ, provided the chosen vertex is empty. Additionally, particles move according to a symmetric exclusion process with rate N. For any d and N, there exists λc such that, when the system starts from a single particle, particles go extinct when λ < λc and have a chance of being present for all times when λ > λc. Durrett and Neuhauser proved that λc converges to 1 as N goes to infinity, and Konno, Katori and Berezin and Mytnik obtained dimension-dependent asymptotics for this convergence, which are sharp in dimensions 3 and higher. We obtain a lower bound which is new in dimension 2 and also gives the sharp asymptotics in dimensions 3 and higher. Our proof involves an estimate for two-type renewal processes which is of independent interest.