Rapid phase ordering of Ising dynamics on Z2

Abstract

We consider the phase ordering problem for the low-temperature Ising dynamics initialized from a biased and disordered initialization. Work of Fontes, Schonmann, Sidoravicius (2002) showed that at zero-temperature, Ising Glauber dynamics on Zd for d 2 initialized from i.i.d. spins on each vertex that are +1 with sufficiently large probability, absorbs into the all-plus configuration quickly. We prove that analogous behavior holds throughout the low-temperature regime of the Ising model in two dimensions. Namely, there exists p0 <1 such that Ising Glauber dynamics initialized from i.i.d. spins that are +1 with probability p>p0, run at any low temperature β>βc converges rapidly to the plus phase measure π+. The result is proved using a spacetime multiscale coupling valid in any d 2, that boosts a uniform-in-β quasi-polynomial bound on the mixing time of Ising dynamics with plus boundary conditions, into rapid phase ordering from biased initializations with no boundary conditions.