On the DP-chromatic Number of Cartesian Products of Critical Graphs

TL;DR

This paper investigates the DP-chromatic number of Cartesian products of critical graphs, extending classical results on list coloring, and introduces the DP color function as a key tool for understanding these properties.

Contribution

It extends the understanding of DP-coloring in Cartesian products, particularly for critical graphs, and introduces the DP color function as a new analytical tool.

Findings

Established bounds for DP-chromatic number of Cartesian products involving critical graphs.

Connected the DP color function to classical coloring bounds and product structures.

Provided insights into when the DP-chromatic number exceeds the chromatic number in product graphs.

Abstract

DP-coloring (also called correspondence coloring) is a well-studied generalization of list coloring introduced by Dvo\v{r}\'{a}k and Postle in 2015. The following sharp bound on the DP-chromatic number of the Cartesian product of graphs $G$ and $H$ is known: $\chi_{DP}(G \square H) \leq \text{min}\{\chi_{DP}(G) + \text{col}(H), \chi_{DP}(H) + \text{col}(G) \} - 1$ where $\chi_{DP}(G)$ is the DP-chromatic number of $G$ and $\text{col}(H)$ is the coloring number of $H$. We seek to understand when $\chi_{DP}(G \square K_{l,t})$ is far from its chromatic number: $\chi(G \square K_{l,t}) = \max \{\chi(G), 2 \}$ in the case that $G$ is a $k$-critical graph with $\chi_{DP}(G)=k$. In particular, we have $\chi_{DP}(G \square K_{l,t}) \leq k + l$, and for fixed $l$ we wish to find the smallest $t$ for which this upper bound is achieved. This can be viewed as an extension of the classic result that the list chromatic number of $K_{l,t}$ is $l+1$ if and only if $t \geq l^l$. Our results illustrate that the DP color function of $G$, the DP analogue of the chromatic polynomial, provides a concept and tool that is useful for making progress on this problem.