Periodic p-adic Gibbs measures of q-states Potts model on Cayley tree: The chaos implies the vastness of p-adic Gibbs measures

Abstract

We study the set of p-adic Gibbs measures of the q-states Potts model on the Cayley tree of order three. We prove the vastness of the periodic p-adic Gibbs measures for such model by showing the chaotic behavior of the correspondence Potts--Bethe mapping over Q\p for p 1 \ (mod \ 3). In fact, for 0 < |θ-1|\p < |q|\p2 < 1, there exists a subsystem that isometrically conjugate to the full shift on three symbols. Meanwhile, for 0 < |q|\p2 ≤ |θ-1|\p < |q|\p < 1, there exists a subsystem that isometrically conjugate to a subshift of finite type on r symbols where r ≥ 4. However, these subshifts on r symbols are all topologically conjugate to the full shift on three symbols. The p-adic Gibbs measures of the same model for the cases p=2,3 and the corresponding Potts--Bethe mapping are also discussed.Furthermore, for 0 < |θ-1|\p < |q|\p < 1, we remark that the Potts--Bethe mapping is not chaotic when p=2,\ p=3 and p 2 \ (mod \ 3) and we could not conclude the vastness of the periodic p-adic Gibbs measures. In a forthcoming paper with the same title, we will treat the case 0 < |q|\p ≤ |θ-1|\p < 1 for all p.