Odd graph and its applications to the strong edge coloring

Abstract

A strong edge coloring of a graph is a proper edge coloring in which every color class is an induced matching. The strong chromatic index s'(G) of a graph G is the minimum number of colors in a strong edge coloring of G. Let ≥ 4 be an integer. In this note, we study the odd graphs and show the existence of some special walks. By using these results and Chang's ideas in [Discuss. Math. Graph Theory 34 (4) (2014) 723--733], we show that every planar graph with maximum degree at most and girth at least 10 - 4 has a strong edge coloring with 2 - 1 colors. In addition, we prove that if G is a graph with girth at least 2 - 1 and mad(G) < 2 + 13 - 2, where is the maximum degree and ≥ 4, then s'(G) ≤ 2 - 1, if G is a subcubic graph with girth at least 8 and mad(G) < 2 + 223, then s'(G) ≤ 5.