Fractional DP-Colorings of Sparse Graphs

Abstract

DP-coloring (also known as correspondence coloring) is a generalization of list coloring developed recently by Dvor\'ak and Postle. In this paper we introduce and study the fractional DP-chromatic number DP(G). We characterize all connected graphs G such that DP(G) ≤slant 2: they are precisely the graphs with no odd cycles and at most one even cycle. By a theorem of Alon, Tuza, and Voigt, the fractional list-chromatic number (G) of any graph G equals its fractional chromatic number (G). This equality does not extend to fractional DP-colorings. Moreover, we show that the difference DP(G) - (G) can be arbitrarily large, and, furthermore, DP(G) ≥ d/(2 d) for every graph G of maximum average degree d ≥ 4. On the other hand, we show that this asymptotic lower bound is tight for a large class of graphs that includes all bipartite graphs as well as many graphs of high girth and high chromatic number.