List Coloring a Cartesian Product with a Complete Bipartite Factor

Abstract

We study the list chromatic number of the Cartesian product of any graph G and a complete bipartite graph with partite sets of size a and b, denoted (G Ka,b). We have two motivations. A classic result on the gap between list chromatic number and the chromatic number tells us (Ka,b) = 1 + a if and only if b ≥ aa. Since (Ka,b) ≤ 1 + a for any b ∈ N, this result tells us the values of b for which (Ka,b) is as large as possible and far from (Ka,b)=2. In this paper we seek to understand when (G Ka,b) is far from (G Ka,b) = \(G), 2 \. It is easy to show (G Ka,b) ≤ (G) + a. In 2006, Borowiecki, Jendrol, Kr\'al, and Miskuf showed that this bound is attainable if b is sufficiently large; specifically, (G Ka,b) = (G) + a whenever b ≥ ((G) + a - 1)a|V(G)|. Given any graph G and a ∈ N, we wish to determine the smallest b such that (G Ka,b) = (G) + a. In this paper we show that the list color function, a list analogue of the chromatic polynomial, provides the right concept and tool for making progress on this problem. Using the list color function, we prove a general improvement on Borowiecki et al.'s 2006 result, and we compute the smallest such b exactly for some large families of chromatic-choosable graphs.