On properly ordered coloring of vertices in a vertex-weighted graph

Abstract

We introduce the notion of a properly ordered coloring (POC) of a weighted graph, that generalizes the notion of vertex coloring of a graph. Under a POC, if xy is an edge, then the larger weighted vertex receives a larger color; in the case of equal weights of x and y, their colors must be different. In this paper, we shall initiate the study of this special coloring in graphs. For a graph G, we introduce the function f(G) which gives the maximum number of colors required by a POC over all weightings of G. We show that f(G)=(G), where (G) is the number of vertices of a longest path in G. Another function we introduce is POC(G;t) giving the minimum number of colors required over all weightings of G using t distinct weights. We show that the ratio of POC(G;t)-1 to (G)-1 can be bounded by t for any graph G; in fact, the result is shown by determining POC(G;t) when G is a complete multipartite graph. We also determine the minimum number of colors to give a POC on a vertex-weighted graph in terms of the number of vertices of a longest directed path in an orientation of the underlying graph. This extends the so called Gallai-Hasse-Roy-Vitaver theorem, a classical result concerning the relationship between the chromatic number of a graph G and the number of vertices of a longest directed path in an orientation of G.