Bipartite graphs are (45-) -choosable

Abstract

Alon and Krivelevich conjectured that if G is a bipartite graph of maximum degree , then the choosability (or list chromatic number) of G satisfies (G) = O ( ). Currently, the best known upper bound for (G) is (1 + o(1)) , which also holds for the much larger class of triangle-free graphs. We prove that for = 10-3, every bipartite graph G of sufficiently large maximum degree satisfies (G) < (45 -) . This improved upper bound suggests that list coloring is fundamentally different for bipartite graphs than for triangle-free graphs and hence gives a step toward solving the conjecture of Alon and Krivelevich.