Strong chromatic index of sparse graphs

Abstract

A coloring of the edges of a graph G is strong if each color class is an induced matching of G. The strong chromatic index of G, denoted by s(G), is the least number of colors in a strong edge coloring of G. In this note we prove that s(G)≤ (4k-1) (G)-k(2k+1)+1 for every k-degenerate graph G. This confirms the strong version of conjecture stated recently by Chang and Narayanan [3]. Our approach allows also to improve the upper bound from [3] for chordless graphs. We get that % s(G)≤ 4 -3 for any chordless graph G. Both bounds remain valid for the list version of the strong edge coloring of these graphs.