Connectivity and choosability of graphs with no Kt minor

Abstract

In 1943, Hadwiger conjectured that every graph with no Kt minor is (t-1)-colorable for every t 1. While Hadwiger's conjecture does not hold for list-coloring, the linear weakening is conjectured to be true. In the 1980s, Kostochka and Thomason independently proved that every graph with no Kt minor has average degree O(t t) and thus is O(t t)-list-colorable. Recently, the authors and Song proved that every graph with no Kt minor is O(t( t)β)-colorable for every β > 1 4. Here, we build on that result to show that every graph with no Kt minor is O(t( t)β)-list-colorable for every β > 1 4. Our main new tool is an upper bound on the number of vertices in highly connected Kt-minor-free graphs: We prove that for every β > 1 4, every (t( t)β)-connected graph with no Kt minor has O(t ( t)7/4) vertices.