More bounds for the Grundy number of graphs

Abstract

A coloring of a graph G=(V,E) is a partition \V1, V2, …, Vk\ of V into independent sets or color classes. A vertex v∈ Vi is a Grundy vertex if it is adjacent to at least one vertex in each color class Vj for every j<i. A coloring is a Grundy coloring if every vertex is a Grundy vertex, and the Grundy number (G) of a graph G is the maximum number of colors in a Grundy coloring. We provide two new upper bounds on Grundy number of a graph and a stronger version of the well-known Nordhaus-Gaddum theorem. In addition, we give a new characterization for a \P4, C4\-free graph by supporting a conjecture of Zaker, which says that (G)≥ δ(G)+1 for any C4-free graph G.