Exponential phi-mixing implies exponential psi-mixing for Markov fields on bounded degree graphs

Abstract

We show that for non-degenerate k-Markovian random fields with finite state space over a bounded degree graph with exponential growth rate θ uniform φ-mixing with exponential decay rate λ > 3θ implies uniform -mixing with exponential decay rate (λ - 3θ)/9. As an application we obtain exponential -mixing for Gibbs fields on regular trees arising from finite range potentials such as the Ising model at low inverse temperature or the Potts model with sufficiently many spin states.

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