Strong edge-coloring of sparse graphs with Ore-degree 7 or 8

Abstract

In a strong edge-coloring of a graph G=(V,E), any two edges of distance at most 2 get distinct colors. The strong chromatic index of G, denoted by s'(G), is the minimum number of colors needed in a strong edge-coloring of G. The Ore-degree of G is defined by \d(u)+d(v):uv∈ E\. In this paper, we apply the discharging method and make use of Hall's marriage theorem to prove two results toward a conjecture by Chen et al. First, we prove that if G is a graph with Ore-degree 7 and maximum average degree less than 3411, then s'(G) 13. This result improves the previous best bound from 4013 to 3411. Second, we prove that if G is a graph with Ore-degree 8 and maximum average degree less than 11331, then s'(G) 20.