Abstract
The notions of the Gibbs measure and of the Markov random field are known to coincide in the real case. But in the p-adic case, the class of p-adic Markov random fields is broader than that of p-adic Gibbs measures. We construct p-adic Markov random fields (on finite graphs) that are not p-adic Gibbs measures. We define a p-adic Markov random field on countable graphs and show that the set of such fields is a nonempty closed subspace in the set of all p-adic probability measures © 2013 Pleiades Publishing, Ltd.
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Rozikov, U. A., & Khakimov, O. N. (2013). p-Adic Gibbs measures and Markov random fields on countable graphs. Theoretical and Mathematical Physics, 175(1), 518–525. https://doi.org/10.1007/s11232-013-0042-0
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