Gibbs measures for HC-model with a countable set of spin values on a Cayley tree
Abstract
In this paper, we study the HC-model with a countable set Z of spin values on a Cayley tree of order k≥ 2. This model is defined by a countable set of parameters (that is, the activity function λi>0, i∈ Z). A functional equation is obtained that provides the consistency condition for finite-dimensional Gibbs distributions. Analyzing this equation, the following results are obtained: - Let =Σiλi. For =+∞ there are no translation-invariant Gibbs measures (TIGM) and no two-periodic Gibbs measures (TPGM); - For <+∞, the uniqueness of TIGM is proved; - Let cr(k)=kk(k-1)k+1. If 0<≤ cr, then there is exactly one TPGM that is TIGM; - For > cr, there are exactly three TPGMs, one of which is TIGM.
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