Every graph with no K8-4 minor is 7-colorable

Abstract

Hadwiger's Conjecture from 1943 states that every graph with no Kt minor is (t-1)-colorable; it remains wide open for all t 7. For positive integers t and s, let Kt-s denote the family of graphs obtained from the complete graph Kt by removing s edges. We say that a graph G has no Kt-s minor if it has no H minor for every H∈ Kt-s. Jakobsen in 1971 proved that every graph with no K7-2 minor is 6-colorable. In this paper we consider the next step and prove that every graph with no K8-4 minor is 7-colorable. Our result implies that H-Hadwiger's Conjecture, suggested by Paul Seymour in 2017, is true for every graph H on eight vertices such that the complement of H has maximum degree at least four, a perfect matching, a triangle and a cycle of length four. Our proof utilizes an extremal function for K8-4 minors obtained in this paper, generalized Kempe chains of contraction-critical graphs by Rolek and the second author, and the method for finding K7 minors from three different K5 subgraphs by Kawarabayashi and Toft; this method was first developed by Robertson, Seymour and Thomas in 1993 to prove Hadwiger's Conjecture for t=6.