Gallai colorings and domination in multipartite digraphs

Abstract

Assume that D is a digraph without cyclic triangles and its vertices are partitioned into classes A1,...,At of independent vertices. A set U=i∈ S Ai is called a dominating set of size |S| if for any vertex v∈ i S Ai there is a w in U such that (w,v) is in E(D). Let beta(D) be the cardinality of the largest independent set of D whose vertices are from different partite classes of D. Our main result says that there exists a h=h(beta(D)) such that D has a dominating set of size at most h. This result is applied to settle a problem related to generalized Gallai colorings, edge colorings of graphs without 3-colored triangles.