Hadwiger's conjecture for graphs with forbidden holes

Abstract

Given a graph G, the Hadwiger number of G, denoted by h(G), is the largest integer k such that G contains the complete graph Kk as a minor. A hole in G is an induced cycle of length at least four. Hadwiger's Conjecture from 1943 states that for every graph G, h(G) (G), where (G) denotes the chromatic number of G. In this paper we establish more evidence for Hadwiger's conjecture by showing that if a graph G with independence number α(G)3 has no hole of length between 4 and 2α(G)-1, then h(G)(G). We also prove that if a graph G with independence number α(G)2 has no hole of length between 4 and 2α(G), then G contains an odd clique minor of size (G), that is, such a graph G satisfies the odd Hadwiger's conjecture.