arXiv:2103.04467 Abstract | arXiv Analytics

arXiv:2103.04467 [math.PR]Abstract References Reviews Resources

Metastability and maximal-entropy joinings of Gibbs measures on finitely-generated groups

Published 2021-03-07Version 1

We prove a metastability result for finitary microstates which are good models for a Gibbs measure for a nearest-neighbor interaction on a finitely-generated group. This is used to show that any maximal-entropy joining of two such Gibbs states is a relative product over the tail $\sigma$-algebra, except in degenerate cases. We also use results on extremal cuts of random graphs to further investigate optimal self-joinings of the Ising model on a free group.

Comments: 33 pages

Categories: math.PR, math-ph, math.DS, math.MP

Keywords: gibbs measure, finitely-generated group, maximal-entropy joining, metastability result, random graphs

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