On Star 5-Colorings of Sparse Graphs

Abstract

A star k-coloring of a graph G is a proper (vertex) k-coloring of G such that the vertices on a path of length three receive at least three colors. Given a graph G, its star chromatic number, denoted s(G), is the minimum integer k for which G admits a star k-coloring. Studying star coloring of sparse graphs is an active area of research, especially in terms of the maximum average degree of a graph; the maximum average degree, denoted mad(G), of a graph G is \ 2|E(H)||V(H)|:H ⊂ G\. It is known that for a graph G, if mad(G)<83, then s(G)≤ 6, and if mad(G)< 187 and its girth is at least 6, then s(G) 5. We improve both results by showing that for a graph G, if mad(G) 83, then s(G) 5. As an immediate corollary, we obtain that a planar graph with girth at least 8 has a star 5-coloring, improving the best known girth condition for a planar graph to have a star 5-coloring.