A Simple Construction of Tournaments with Finite and Uncountable Dichromatic Number

Abstract

The dichromatic number (G) of a digraph G is the minimum number of colors needed to color the vertices V(G) in such a way that no monochromatic directed cycle is obtained. In this note, for any k∈ N, we give a simple construction of tournaments with dichromatic number exactly equal to k. The proofs are based on a combinatorial lemma on partitioning a checkerboard which may be of independent interest. We also generalize our finite construction to give an elementary construction of a complete digraph of cardinality equal to the cardinality of R and having an uncountable dichromatic number. Furthermore, we also construct an oriented balanced complete n-partite graph K(m)n, such that the minimum number of colors needed to color its vertices such that there is no monochromatic directed triangle is greater than or equal to nm/(n+2m-2).