Equitable list coloring of planar graphs with given maximum degree

Abstract

If L is a list assignment of r colors to each vertex of an n-vertex graph G, then an equitable L-coloring of G is a proper coloring of vertices of G from their lists such that no color is used more than n/r times. A graph is equitably r-choosable if it has an equitable L-coloring for every r-list assignment L. In 2003, Kostochka, Pelsmajer and West (KPW) conjectured that an analog of the famous Hajnal-Szemer\'edi Theorem on equitable coloring holds for equitable list coloring, namely, that for each positive integer r every graph G with maximum degree at most r-1 is equitably r-choosable. The main result of this paper is that for each r≥ 9 and each planar graph G, a stronger statement holds: if the maximum degree of G is at most r, then G is equitably r-choosable. In fact, we prove the result for a broader class of graphs -- the class B of the graphs in which each bipartite subgraph B with |V(B)|3 has at most 2|V(B)|-4 edges. Together with some known results, this implies that the KPW Conjecture holds for all graphs in B, in particular, for all planar graphs.