Regions without complex zeros for chromatic polynomials on graphs with bounded degree

Abstract

We prove that the chromatic polynomial PG(q) of a finite graph G of maximal degree is free of zeros for q C*() with C*() = 0<x<21 -1 (1+x)-1 x [2-(1+x)] This improves results by Sokal (2001) and Borgs (2005). Furthermore, we present a strengthening of this condition for graphs with no triangle-free vertices.