DP color functions versus chromatic polynomials for hypergraphs (I)

Abstract

For a hypergraph H, the DP color function PDP(H,k) of H is an extension of the chromatic polynomial P(H,k) with the property that PDP(H,k) P(H,k) for all positive integers k. In this article, we primarily investigate the influence of the minimum cycle length on the DP-coloring function, as well as the relevant properties of the DP-coloring function of H Kp (i.e., the join of H and Kp). We show that for any linear and uniform hypergraph H with even girth, there exists a positive integer N such that PDP ( H, k) < P( H, k) for all integers k N, and this conclusion also holds for any hypergraph H that contains an edge e with the properties that H-e has exactly |e|-1 components and any shortest cycle in H containing e is an even cycle. For the hypergraph H Kp, we prove that if H is uniform, then there exist positive integers p and N such that PDP(H Kp,k)=P(H Kp,k) holds for all integers k≥ N.