English

On phase transition for one dimensional countable state $P$-adic Potts model

Mathematical Physics 2011-06-29 v1 Functional Analysis math.MP

Abstract

In the present paper we shall consider countable state pp-adic Potts model on Z+Z_+. A main aim is to establish the existence of the phase transition for the model. In our study, we essentially use one dimensionality of the model. To show it we reduce the problem, to the investigation of an infinite-dimensional nonlinear equation. We find a condition on weights to show that the derived equation has two solutions, which yields the existence of the phase transition. We prove that measures corresponding to first and second solutions are a pp-adic Gibbs and generalized pp-adic Gibbs measures, respectively. Note that it turns out that the finding condition does not depend on values of the prime pp, and therefore, an analogous fact is not true when the number of spins is finite. Note that, in the usual real case, if one considers one dimensional translation-invariant model with nearest neighbor interaction, then such a model does not exhibit a phase transition. Nevertheless, we should stress that in our model there does not occur the strong phase transition, this means that there is only one pp-adic Gibbs measure. Here we may see some similarity with the real case. Besides, we prove that the pp-adic Gibbs measure is bounded, and the generalized one is not bounded.

Keywords

Cite

@article{arxiv.1106.5560,
  title  = {On phase transition for one dimensional countable state $P$-adic Potts model},
  author = {Farrukh Mukhamedov},
  journal= {arXiv preprint arXiv:1106.5560},
  year   = {2011}
}

Comments

17 pages

R2 v1 2026-06-21T18:28:25.828Z