Phase transitions for P-adic Potts model on the Cayley tree of order three

Abstract

In the present paper, we study a phase transition problem for the q-state p-adic Potts model over the Cayley tree of order three. We consider a more general notion of p-adic Gibbs measure which depends on parameter ∈p. Such a measure is called generalized p-adic quasi Gibbs measure. When equals to p-adic exponent, then it coincides with the p-adic Gibbs measure. When =p, then it coincides with p-adic quasi Gibbs measure. Therefore, we investigate two regimes with respect to the value of ||p. Namely, in the first regime, one takes =p(J) for some J∈p, in the second one ||p<1. In each regime, we first find conditions for the existence of generalized p-adic quasi Gibbs measures. Furthermore, in the first regime, we establish the existence of the phase transition under some conditions. In the second regime, when ||p,|q|p≤ p-2 we prove the existence of a quasi phase transition. It turns out that if ||p<|q-1|p2<1 and -3∈p, then one finds the existence of the strong phase transition.