Trivial coloring of Cartesian product of graphs

Abstract

A coloring of a direct product of graphs is said to be trivial iff it is induced by some coloring of a factor of the product. A graph G is trivially power colorable iff every coloring of a finite power of G with (G)-many colors is trivial. Greenwell and Lov\'asz proved that the finite complete graphs Kn for n 3 are trivially power colorable. Generalizing their result we define a much wider class of trivially power-colorable graphs: if G is a finite, connected graph with (G) 3 and every vertex of G is in a clique of size (G), then G is trivially power-colorable. As an application of this result, we give a complete characterization of trivially power-colorable cographs. Finally, we give a structural description of the colorings of infinite powers of trivially power-colorable finite graphs.