On zero-free regions for the anti-ferromagnetic Potts model on bounded-degree graphs

Abstract

For a graph G=(V,E), k∈ N, and a complex number w the partition function of the univariate Potts model is defined as \[ Z(G;k,w):=Σφ:V [k]Πuv∈ E \\ φ(u)=φ(v)w, \] where [k]:=\1,…,k\. In this paper we give zero-free regions for the partition function of the anti-ferromagnetic Potts model on bounded degree graphs. In particular we show that for any ∈ N and any k≥ e+1, there exists an open set U in the complex plane that contains the interval [0,1) such that Z(G;k,w)≠ 0 for any w∈ U and any graph G of maximum degree at most . (Here e denotes the base of the natural logarithm.) For small values of we are able to give better results. As an application of our results we obtain improved bounds on k for the existence of deterministic approximation algorithms for counting the number of proper k-colourings of graphs of small maximum degree.