On colouring oriented graphs of large girth

Abstract

We prove that for every oriented graph D and every choice of positive integers k and , there exists an oriented graph D* along with a surjective homomorphism V(D*) V(D) such that: (i) girth(D*) ≥; (ii) for every oriented graph C with at most k vertices, there exists a homomorphism from D* to C if and only if there exists a homomorphism from D to C; and (iii) for every D-pointed oriented graph C with at most k vertices and for every homomorphism V(D*) V(C) there exists a unique homomorphism f V(D) V(C) such that =f . Determining the oriented chromatic number of an oriented graph D is equivalent to finding the smallest integer k such that D admits a homomorphism to an order-k tournament, so our main theorem yields results on the girth and oriented chromatic number of oriented graphs. While our main proof is probabilistic (hence nonconstructive), for any given ≥ 3 and k≥ 5, we include a construction of an oriented graph with girth and oriented chromatic number k.