Coarsening model on Zd with biased zero-energy flips and an exponential large deviation bound for ASEP

Abstract

We study the coarsening model (zero-temperature Ising Glauber dynamics) on Zd (for d ≥ 2) with an asymmetric tie-breaking rule. This is a Markov process on the state space \-1,+1\Zd of "spin configurations" in which each vertex updates its spin to agree with a majority of its neighbors at the arrival times of a Poisson process. If a vertex has equally many +1 and -1 neighbors, then it updates its spin value to +1 with probability q ∈ [0,1] and to -1 with probability 1-q. The initial state of this Markov chain is distributed according to a product measure with probability p for a spin to be +1. In this paper, we show that for any given p>0, there exist q close enough to 1 such that a.s. every spin has a limit of +1. This is of particular interest for small values of p, for which it is known that if q=1/2, a.s. all spins have a limit of -1. For dimension d=2, we also obtain near-exponential convergence rates for q sufficiently large, and for general d, we obtain stretched exponential rates independent of d. Two important ingredients in our proofs are refinements of block arguments of Fontes-Schonmann-Sidoravicius and a novel exponential large deviation bound for the Asymmetric Simple Exclusion Process.