Bounds and Hardness Results for Conflict-free Choosability

Abstract

A '(partial) conflict-free coloring' of a hypergraph H is an assignment of colors to (a subset of) the vertex set of H such that every hyperedge in H has a vertex whose color is distinct from every other vertex in that hyperedge. The minimum number of colors required for such a coloring is known as the '(partial) conflict-free chromatic number' of H. It is easy to see that the conflict-free chromatic number of a hypergraph is at most its partial conflict-free chromatic number plus one. Conflict-free coloring has also been studied on the open/closed neighborhood hypergraphs of a given graph under the name open/closed neighborhood conflict-free coloring. In this paper, we study partial and full list variants of conflict-free coloring where, for every vertex v, we are given a list of admissible colors Lv such that v is allowed to be colored only from Lv. Bhyravarapu, Kalyanasundaram, and Mathew [Journal of Graph Theory, 2021] showed that the closed-neighborhood conflict-free chromatic number of any graph G with maximum degree Δ is at most O(2 Δ). In this paper, we extend the O(2 Δ) upper bound to the partial list variant of the closed-neighborhood conflict-free chromatic number. Further, we establish computational complexity results concerning the list open/closed-neighborhood conflict-free chromatic numbers.