Improved Bounds on the Phase Transition for the Hard-Core Model in 2-Dimensions

Abstract

For the hard-core lattice gas model defined on independent sets weighted by an activity λ, we study the critical activity λc(Z2) for the uniqueness/non-uniqueness threshold on the 2-dimensional integer lattice Z2. The conjectured value of the critical activity is approximately 3.796. Until recently, the best lower bound followed from algorithmic results of Weitz (2006). Weitz presented an FPTAS for approximating the partition function for graphs of constant maximum degree when λ<λc(T) where T is the infinite, regular tree of degree . His result established a certain decay of correlations property called strong spatial mixing (SSM) on Z2 by proving that SSM holds on its self-avoiding walk tree Tsawσ(Z2) where σ=(σv)v∈ Z2 and σv is an ordering on the neighbors of vertex v. As a consequence he obtained that λc(Z2)≥λc( T4) = 1.675. Restrepo et al. (2011) improved Weitz's approach for the particular case of Z2 and obtained that λc(Z2)>2.388. In this paper, we establish an upper bound for this approach, by showing that, for all σ, SSM does not hold on Tsawσ(Z2) when λ>3.4. We also present a refinement of the approach of Restrepo et al. which improves the lower bound to λc(Z2)>2.48.