UPPER ORIENTED CHROMATIC NUMBER OF UNDIRECTED GRAPHS AND ORIENTED COLORINGS OF PRODUCT GRAPHS

The oriented chromatic number of an oriented graph (G) over right arrow is the minimum order of an oriented graph (H) over right arrow such that (G) over right arrow admits a homomorphism to (H) over right arrow. The oriented chromatic number of an undirected graph G is then the greatest oriented chromatic number of its orientations. In this paper, we introduce the new notion of the upper oriented chromatic number of an undirected graph G, defined as the minimum order of an oriented graph (U) over right arrow such that every orientation (G) over right arrow of G admits a homomorphism to (U) over right arrow. We give some properties of this parameter, derive some general upper bounds on the ordinary and upper oriented chromatic numbers of lexicographic, strong, Cartesian and direct products of graphs, and consider the particular case of products of paths.