Answers to Two Questions on the DP Color Function

Abstract

DP-coloring is a generalization of list coloring that was introduced in 2015 by Dvor\'ak and Postle. The chromatic polynomial of a graph is a notion that has been extensively studied since the early 20th century. The chromatic polynomial of graph G is denoted P(G,m), and it is equal to the number of proper m-colorings of G. In 2019, Kaul and Mudrock introduced an analogue of the chromatic polynomial for DP-coloring; specifically, the DP color function of graph G is denoted PDP(G,m). Two fundamental questions posed by Kaul and Mudrock are: (1) For any graph G with n vertices, is it the case that P(G,m)-PDP(G,m) = O(mn-3) as m → ∞? and (2) For every graph G, does there exist p,N ∈ N such that PDP(Kp G, m) = P(Kp G, m) whenever m ≥ N? We show that the answer to both these questions is yes. In fact, we show the answer to (2) is yes even if we require p=1.