English

Graphical Representations for Ising and Potts Models in General External Fields

Probability 2016-01-27 v2 Mathematical Physics math.MP

Abstract

This work is concerned with the theory of Graphical Representation for the Ising and Potts Models over general lattices with non-translation invariant external field. We explicitly describe in terms of the Random Cluster Representation the distribution function and, consequently, the expected value of a single spin for the Ising and qq-states Potts Models with general external fields. We also consider the Gibbs States for the Edwards-Sokal Representation of the Potts Model with non-translation invariant magnetic field and prove a version of the FKG Inequality for the so called General Random Cluster Model (GRC Model) with free and wired boundary conditions in the non-translation invariant case. Adding the amenability hypothesis on the lattice, we obtain the uniqueness of the infinite connected component and the quasilocality of the Gibbs Measures for the GRC Model with such general magnetic fields. As a final application of the theory developed, we show the uniqueness of the Gibbs Measures for the Ferromagnetic Ising Model with a positive power law decay magnetic field, as conjectured in [8].

Keywords

Cite

@article{arxiv.1506.06818,
  title  = {Graphical Representations for Ising and Potts Models in General External Fields},
  author = {Leandro Cioletti and Roberto Vila},
  journal= {arXiv preprint arXiv:1506.06818},
  year   = {2016}
}

Comments

56 pages. Accepted for publication in Journal of Statistical Physics

R2 v1 2026-06-22T09:58:15.643Z