Article

Periodic Gibbs Measures and Their Extremes for the HC–Blume–Capel Model in the Case of a ‘‘Wand’’ on the Cayley Tree

N. M. KhatamovV. I. Romanovskii Institute of Mathematics, Academy of Sciences of Uzbekistan, 100174, Tashkent, Uzbekistan

Lobachevskii Journal of Mathematicsjournal2022en

ABI

Abstract

In this paper, we study the periodic Gibbs measures for the HC–Blume–Capel model in the case of a ‘‘wand’’ on a Cayley tree of order two. It is proved that in this case, for $$0<\theta<1$$ there exist exactly three periodic Gibbs measures that are translation-invariant; and for $$\theta>1$$ there exist exactly three periodic Gibbs measures, one of which is translation-invariant, two others are periodic (not translation-invariant) with period two. In addition, the problem of the (non) extremes of these measures has been studied.

Topics

Theoretical and Computational Physics Material Dynamics and Properties Stochastic processes and statistical mechanics

Identifiers

DOI: 10.1134/s1995080222120174

Citations and references

Cited by 4 25 references

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