A Note on the Rainbow Connectivity of Tournaments

Abstract

An arc-coloured digraph D is said to be rainbow connected if for every two vertices u and v there is an uv-path all whose arcs have different colours. The minimun number of colours required to make the digraph rainbow connected is called the rainbow connection number of D, denoted →rc(D). In Dorbec it was showed that if T is a strong tournament with n≥ 5 vertices, then 2≤ →rc(T)≤ n-1; and that for every n and k such that 3≤ k≤ n-1, there exists a tournament T on n vertices such that →rc(T)=k. In this note it is showed that for any n6, there is a tournament T of n vertices such that →rc(T)=2.