The m-Degenerate Chromatic Number of a Digraph

Abstract

The digraph chromatic number of a directed graph D, denoted A(D), is the minimum positive integer k such that there exists a partition of the vertices of D into k disjoint sets, each of which induces an acyclic subgraph. For any m ≥ 1, a digraph is weakly m-degenerate if each of its induced subgraphs has a vertex of in-degree or out-degree less than m. We introduce a generalization of the digraph chromatic number, namely m(D), which is the minimum number of sets into which the vertices of a digraph D can be partitioned so that each set induces a weakly m-degenerate subgraph. We show that for all digraphs D without directed 2-cycles, m(D) ≤ 2(D)4m+1 + O(1). Because 1(D) = A(D), we obtain as a corollary that A(D) ≤ 2/5 · (D) + O(1). We then use this bound to show that A(D) ≤ 2/3 · (D) + O(1), substantially improving a bound of Harutyunyan and Mohar that states that A(D) ≤ (1 - e-13)· (D) for large enough (D).