Strong chromatic index of bipartite graphs

Abstract

An edge-coloring of a graph G is called a strong edge-coloring if all its color classes are induced matchings in G; the minimum number of colors required for such a coloring, denoted by χs'(G), is known as the strong chromatic index of G. For each vertex v of a graph G, let dG(v) denote the degree of v in G. Let G be a bipartite graph with partite sets A and B, and let ΔA=\dG(a): a∈ A\ and ΔB=\dG(b): b∈ B\. A conjecture of Brualdi and Quinn Massey asserts that \( χs'(G) ΔA ΔB\). In this paper, we show that \(χs'(G) 1.676\, ΔA ΔB\) provided that the product ΔAΔB is sufficiently large.