A Note on the Equitable Choosability of Complete Bipartite Graphs

Abstract

In 2003 Kostochka, Pelsmajer, and West introduced a list analogue of equitable coloring called equitable choosability. A k-assignment, L, for a graph G assigns a list, L(v), of k available colors to each v ∈ V(G), and an equitable L-coloring of G is a proper coloring, f, of G such that f(v) ∈ L(v) for each v ∈ V(G) and each color class of f has size at most |V(G)|/k . Graph G is said to be equitably k-choosable if an equitable L-coloring of G exists whenever L is a k-assignment for G. In this note we study the equitable choosability of complete bipartite graphs. A result of Kostochka, Pelsmajer, and West implies Kn,m is equitably k-choosable if k ≥ \n,m\ provided Kn,m ≠ K2l+1, 2l+1. We prove Kn,m is equitably k-choosable if m ≤ (m+n)/k (k-n) which gives Kn,m is equitably k-choosable for certain k satisfying k < \n,m\. We also give a complete characterization of the equitable choosability of complete bipartite graphs that have a partite set of size at most 2.