Strengthened Brooks Theorem for digraphs of girth three

Abstract

Brooks' Theorem states that a connected graph G of maximum degree has chromatic number at most , unless G is an odd cycle or a complete graph. A result of Johansson (1996) shows that if G is triangle-free, then the chromatic number drops to O( / ). In this paper, we derive a weak analog for the chromatic number of digraphs. We show that every (loopless) digraph D without directed cycles of length two has chromatic number (D) ≤ (1-e-13) , where is the maximum geometric mean of the out-degree and in-degree of a vertex in D, when is sufficiently large. As a corollary it is proved that there exists an absolute constant α < 1 such that (D) ≤ α ( + 1) for every > 2.