Strong odd coloring of sparse graphs

Abstract

An odd coloring of a graph G is a proper coloring of G such that for every non-isolated vertex v, there is a color appearing an odd number of times in NG(v). Odd coloring of graphs was studied intensively in recent few years. In this paper, we introduce the notion of a strong odd coloring, as not only a strengthened version of odd coloring, but also a relaxation of square coloring. A strong odd coloring of a graph G is a proper coloring of G such that for every non-isolated vertex v, if a color appears in NG(v), then it appears an odd number of times in NG(v). We denote by χso(G) the smallest integer k such that G admits a strong odd coloring with k colors. We prove that if G is a graph with mad(G)207, then χso(G) Δ(G)+4, and the bound is tight. We also prove that if G is a C4-free graph with mad(G)3011, then χso(G) Δ(G)+3.