English

List Coloring a Cartesian Product with a Complete Bipartite Factor

Combinatorics 2018-11-07 v1

Abstract

We study the list chromatic number of the Cartesian product of any graph GG and a complete bipartite graph with partite sets of size aa and bb, denoted χ(GKa,b)\chi_\ell(G \square K_{a,b}). We have two motivations. A classic result on the gap between list chromatic number and the chromatic number tells us χ(Ka,b)=1+a\chi_\ell(K_{a,b}) = 1 + a if and only if baab \geq a^a. Since χ(Ka,b)1+a\chi_\ell(K_{a,b}) \leq 1 + a for any bNb \in \mathbb{N}, this result tells us the values of bb for which χ(Ka,b)\chi_\ell(K_{a,b}) is as large as possible and far from χ(Ka,b)=2\chi(K_{a,b})=2. In this paper we seek to understand when χ(GKa,b)\chi_\ell(G \square K_{a,b}) is far from χ(GKa,b)=max{χ(G),2}\chi(G \square K_{a,b}) = \max \{\chi(G), 2 \}. It is easy to show χ(GKa,b)χ(G)+a\chi_\ell(G \square K_{a,b}) \leq \chi_\ell (G) + a. In 2006, Borowiecki, Jendrol, Kr\'al, and Miskuf showed that this bound is attainable if bb is sufficiently large; specifically, χ(GKa,b)=χ(G)+a\chi_\ell(G \square K_{a,b}) = \chi_\ell (G) + a whenever b(χ(G)+a1)aV(G)b \geq (\chi_\ell(G) + a - 1)^{a|V(G)|}. Given any graph GG and aNa \in \mathbb{N}, we wish to determine the smallest bb such that χ(GKa,b)=χ(G)+a\chi_\ell(G \square K_{a,b}) = \chi_\ell (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 bb exactly for some large families of chromatic-choosable graphs.

Keywords

Cite

@article{arxiv.1811.02420,
  title  = {List Coloring a Cartesian Product with a Complete Bipartite Factor},
  author = {Hemanshu Kaul and Jeffrey A. Mudrock},
  journal= {arXiv preprint arXiv:1811.02420},
  year   = {2018}
}

Comments

12 pages

R2 v1 2026-06-23T05:06:27.100Z