On Uniqueness of Gibbs Measures for P-Adic Nonhomogeneous -Model on the Cayley Tree
Abstract
We consider a nearest-neighbor p-adic -model with spin values 1 on a Cayley tree of order k≥ 1. We prove for the model there is no phase transition and as well as the unique p-adic Gibbs measure is bounded if and only if p≥ 3. If p=2 then we find a condition which guarantees nonexistence of a phase transition. Besides, the results are applied to the p-adic Ising model and we show that for the model there is a unique p-adic Gibbs measure.
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