Gibbs measures over locally tree-like graphs and percolative entropy over infinite regular trees

Abstract

Consider a statistical physical model on the d-regular infinite tree Td described by a set of interactions . Let \Gn\ be a sequence of finite graphs with vertex sets Vn that locally converge to Td. From one can construct a sequence of corresponding models on the graphs Gn. Let \μn\ be the resulting Gibbs measures. Here we assume that \μn\ converges to some limiting Gibbs measure μ on Td in the local weak* sense, and study the consequences of this convergence for the specific entropies |Vn|-1H(μn). We show that the limit supremum of |Vn|-1H(μn) is bounded above by the percolative entropy Hperc(μ), a function of μ itself, and that |Vn|-1H(μn) actually converges to Hperc(μ) in case exhibits strong spatial mixing on Td. We discuss a few examples of well-known models for which the latter result holds in the high temperature regime.