Disproof of a Conjecture by Woodall

Abstract

In 2001, Woodall conjectured that for every pair of integers s,t 1, all graphs without a Ks,t-minor are (s+t-1)-choosable. In this note we refute this conjecture in a strong form: We prove that for every choice of constants >0 and C 1 there exists N=N(,C) ∈ N such that for all integers s,t with N s t Cs there exists a graph without a Ks,t-minor and list chromatic number greater than (1-)(2s+t).