Enumeratively Chromatic-Choosable Theta Graphs

Abstract

Chromatic choosability is a notion of fundamental importance in list coloring. A graph G is chromatic-choosable when its chromatic number, (G), is equal to its list chromatic number (G). In 1990, Kostochka and Sidorenko introduced the list color function of a graph G, denoted P(G,m), which is the list analogue of the chromatic polynomial of G, P(G,m). A graph G is said to be enumeratively chromatic-choosable when P(G,m)=P(G,m) for every m ∈ N. Theta graphs and their generalizations have played an important role in graph coloring problems over the years; for example, they appear in the characterization of chromatic-choosable graphs with chromatic number 2. In this paper we characterize the enumeratively chromatic-choosable theta graphs. Our proof utilizes ideas from DP-coloring (a.k.a. correspondence coloring), providing yet another example of how the more general setting of DP-coloring can be leveraged to attack a problem in list coloring.