Deterministic approximate counting of colorings with fewer than 2 colors via absence of zeros

Abstract

Let ,q≥ 3 be integers. We prove that there exists η≥ 0.002 such that if q≥ (2-η), then there exists an open set U⊂ C that contains the interval [0,1] such that for each w∈ U and any graph G=(V,E) of maximum degree at most , the partition function of the anti-ferromagnetic q-state Potts model evaluated at w does not vanish. This provides a (modest) improvement on a result of Liu, Sinclair, and Srivastava, and breaks the q=2-barrier for this problem. As a direct consequence we obtain via Barvinok's interpolation method a deterministic polynomial time algorithm to approximate the number of proper q-colorings of graphs of maximum degree at most , provided q≥ (2-η).