DP-Coloring of Graphs from Random Covers

Abstract

DP-coloring (also called correspondence coloring) of graphs is a generalization of list coloring that has been widely studied since its introduction by Dvor\'ak and Postle in 2015. Intuitively, DP-coloring generalizes list coloring by allowing the colors that are identified as the same to vary from edge to edge. Formally, DP-coloring of a graph G is equivalent to an independent transversal in an auxiliary structure called a DP-cover of G. In this paper, we introduce the notion of random DP-covers and study the behavior of DP-coloring from such random covers. We prove a series of results about the probability that a graph is or is not DP-colorable from a random cover. These results support the following threshold behavior on random k-fold DP-covers as ∞ where is the maximum density of a graph: graphs are non-DP-colorable with high probability when k is sufficiently smaller than /, and graphs are DP-colorable with high probability when k is sufficiently larger than /. Our results depend on growing fast enough and imply a sharp threshold for dense enough graphs. For sparser graphs, we analyze DP-colorability in terms of degeneracy. We also prove fractional DP-coloring analogs to these results.