A note concerning the Grundy and b-chromatic number of graphs

Abstract

The Grundy number of a graph G is the maximum number of colors used by the First-Fit coloring of G and is denoted by (G). Similarly, the b-chromatic number b(G) of G expresses the worst case behavior of another well-known coloring procedure i.e. color-dominating coloring of G. We obtain some families of graphs F for which there exists a function f(x) such that (G)≤ f(b(G)), for each graph G from the family. Call any such family (,b)-bounded family. We conjecture that the family of b-monotone graphs is (,b)-bounded and validate the conjecture for some families of graphs.