Strengthening the Directed Brooks' Theorem for oriented graphs and consequences on digraph redicolouring

Abstract

Let D=(V,A) be a digraph. We define (D) as the maximum of \ (d+(v),d-(v)) v ∈ V \ and (D) as the maximum of \ (d+(v),d-(v)) v ∈ V \. It is known that the dichromatic number of D is at most (D) + 1. In this work, we prove that every digraph D which has dichromatic number exactly (D) + 1 must contain the directed join of Kr and Ks for some r,s such that r+s = (D) + 1, except if (D) = 2 in which case D must contain a digon. In particular, every oriented graph G with (G) ≥ 2 has dichromatic number at most (G). Let G be an oriented graph of order n such that (G) ≤ 1. Given two 2-dicolourings of G, we show that we can transform one into the other in at most n steps, by recolouring one vertex at each step while maintaining a dicolouring at any step. Furthermore, we prove that, for every oriented graph G on n vertices, the distance between two k-dicolourings is at most 2(G)n when k≥ (G) + 1. We then extend a theorem of Feghali, Johnson and Paulusma to digraphs. We prove that, for every digraph D with (D) = ≥ 3 and every k≥ +1, the k-dicolouring graph of D consists of isolated vertices and at most one further component that has diameter at most cn2, where c = O(2) is a constant depending only on .