Directed Ramsey number for trees

Abstract

In this paper, we study Ramsey-type problems for directed graphs. We first consider the k-colour oriented Ramsey number of H, denoted by R(H,k), which is the least n for which every k-edge-coloured tournament on n vertices contains a monochromatic copy of H. We prove that R(T,k) ck|T|k for any oriented tree T. This is a generalisation of a similar result for directed paths by Chv\'atal and by Gy\'arf\'as and Lehel, and answers a question of Yuster. In general, it is tight up to a constant factor. We also consider the k-colour directed Ramsey number R(H,k) of H, which is defined as above, but, instead of colouring tournaments, we colour the complete directed graph of order n. Here we show that R(T,k) ck|T|k-1 for any oriented tree T, which is again tight up to a constant factor, and it generalises a result by Williamson and by Gy\'arf\'as and Lehel who determined the 2-colour directed Ramsey number of directed paths.