Further progress towards Hadwiger's conjecture

Abstract

In 1943, Hadwiger conjectured that every graph with no Kt minor is (t-1)-colorable for every t 1. In the 1980s, Kostochka and Thomason independently proved that every graph with no Kt minor has average degree O(t t) and hence is O(t t)-colorable. Recently, Norin, Song and the author showed that every graph with no Kt minor is O(t( t)β)-colorable for every β > 1/4, making the first improvement on the order of magnitude of the O(t t) bound. Building on that work, we show in this paper that every graph with no Kt minor is O(t ( t)β)-colorable for every β > 0. More specifically in conjunction with another paper by the author, they are O(t · ( t)18)-colorable.