On the mixing time of the 2D stochastic Ising model with "plus" boundary conditions at low temperature

Abstract

We consider the Glauber dynamics for the 2D Ising model in a box of side L, at inverse temperature β and random boundary conditions τ whose distribution P either stochastically dominates the extremal plus phase (hence the quotation marks in the title) or is stochastically dominated by the extremal minus phase. A particular case is when P is concentrated on the homogeneous configuration identically equal to + (equal to -). For β large enough we show that for any ε there exists c=c(β,ε) such that the corresponding mixing time Tmix satisfies L∞P(Tmix> (cLε)) =0. In the non-random case τ + (or τ -), this implies that Tmix< (cLε). The same bound holds when the boundary conditions are all + on three sides and all - on the remaining one. The result, although still very far from the expected Lifshitz behaviour Tmix=O(L2), considerably improves upon the previous known estimates of the form Tmix (c L1/2 + ε). The techniques are based on induction over length scales, combined with a judicious use of the so-called "censoring inequality" of Y. Peres and P. Winkler, which in a sense allows us to guide the dynamics to its equilibrium measure.