Uniqueness and statistical properties of the Gibbs state on general one-dimensional lattice systems with markovian structure
Abstract
Let M be a compact metric space and X = MN, we consider a set of admissible sequences XA, I ⊂ X determined by a continuous admissibility function A : M × M R and a compact set I ⊂ R. Given a Lipschitz continuous potential : XA, I R, we prove uniqueness of the Gibbs state μ and we show that it is a Gibbs-Bowen measure and satisfies a central limit theorem.
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