Upper bounds for the 2-hued chromatic number of graphs in terms of the independence number

Abstract

A 2-hued coloring of a graph G (also known as conditional (k, 2)-coloring and dynamic coloring) is a coloring such that for every vertex v∈ V(G) of degree at least 2, the neighbors of v receive at least 2 colors. The smallest integer k such that G has a 2-hued coloring with k colors, is called the 2-hued chromatic number of G and denoted by 2(G). In this paper, we will show that if G is a regular graph, then 2(G)- (G) ≤ 2 2(α(G)) +O(1) and if G is a graph and δ(G)≥ 2, then 2(G)- (G) ≤ 1+ [δ -1]42 ( 1+ 2(G)2(G)-δ(G) (α(G)) ) and in general case if G is a graph, then 2(G)- (G) ≤ 2+ α(G),α(G)+ω(G)2 .