A zero-free interval for chromatic polynomials of graphs with 3-leaf spanning trees

Abstract

It is proved that if G is a graph containing a spanning tree with at most three leaves, then the chromatic polynomial of G has no roots in the interval (1,t1], where t1 ≈ 1.2904 is the smallest real root of the polynomial (t-2)6 +4(t-1)2(t-2)3 -(t-1)4. We also construct a family of graphs containing such spanning trees with chromatic roots converging to t1 from above. We employ the Whitney 2-switch operation to manage the analysis of an infinite class of chromatic polynomials.