Star coloring of sparse graphs

Abstract

A proper coloring of the vertices of a graph is called a star coloring if the union of every two color classes induces a star forest. The star chromatic number s(G) is the smallest number of colors required to obtain a star coloring of G. In this paper, we study the relationship between the star chromatic number s(G) and the maximum average degree Mad(G) of a graph G. We prove that: (1) If G is a graph with Mad(G) < 2611, then s(G)≤ 4. (2) If G is a graph with Mad(G) < 187 and girth at least 6, then s(G)≤ 5. (3) If G is a graph with Mad(G) < 83 and girth at least 6, then s(G)≤ 6. These results are obtained by proving that such graphs admit a particular decomposition into a forest and some independent sets.