Abstract:
We call the digraph D an m-coloured digraph if the arcs of D are coloured with m colours. A directed path (or a directed cycle) is called monochromatic if all of its arcs are coloured alike. A set N subset of or equal to V(D) is said to be a kernel by monochromatic paths if it satisfies the following two conditions: (i) For every pair of different vertices u, v is an element of N, there is no monochromatic directed path between them. (ii) For every vertex x is an element of (V(D) - N), there is a vertex y is an element of N such that there is an xy-monochromatic directed path. In this paper it is proved that if D is an m-coloured bipartite tournament such that every directed cycle of length 4 is monochromatic, then D has a kernel by monochromatic paths. (C) 2004 Elsevier B.V. All tights reserved.