English

First-Order Phase Transition in Potts Models with finite-range interactions

Mathematical Physics 2014-09-25 v1 math.MP

Abstract

We consider the QQ-state Potts model on Zd\mathbb Z^d, Q3Q\ge 3, d2d\ge 2, with Kac ferromagnetic interactions and scaling parameter \ga\ga. We prove the existence of a first order phase transition for large but finite potential ranges. More precisely we prove that for \ga\ga small enough there is a value of the temperature at which coexist Q+1Q+1 Gibbs states. The proof is obtained by a perturbation around mean-field using Pirogov-Sinai theory. The result is valid in particular for d=2d=2, Q=3, in contrast with the case of nearest-neighbor interactions for which available results indicate a second order phase transition. Putting both results together provides an example of a system which undergoes a transition from second to first order phase transition by changing only the finite range of the interaction.

Keywords

Cite

@article{arxiv.math-ph/0609051,
  title  = {First-Order Phase Transition in Potts Models with finite-range interactions},
  author = {Thierry Gobron and Immacolata Merola},
  journal= {arXiv preprint arXiv:math-ph/0609051},
  year   = {2014}
}

Comments

Soumis pour publication a Journal of statistical physics - version r\'{e}vis\'{e}e