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A Dobrushin-Lanford-Ruelle theorem for irreducible sofic shifts

We show that for a potential with summable variations on an irreducible sofic shift in one dimension, the equilibrium measures are precisely the shift-invariant Gibbs measures. The main tool in the proof is a preservation of Gibbsianness result for almost invertible factor codes on irreducible shifts of finite type, which we then extend to finite-to-one codes by applying the results about equilibrium measures.

preprint2020arXivOpen access
Luísa BorsatoSophie MacDonald
math.DS
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Luísa BorsatoSophie MacDonald

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