New bounds for locally irregular chromatic index of bipartite and subcubic graphs

Abstract

A graph is locally irregular if the neighbors of every vertex v have degrees distinct from the degree of v. locally irregular edge-coloring of a graph G is an (improper) edge-coloring such that the graph induced on the edges of any color class is locally irregular. It is conjectured that 3 colors suffice for a locally irregular edge-coloring. Recently, Bensmail et al. (Bensmail, Merker, Thomassen: Decomposing graphs into a constant number of locally irregular subgraphs, European J. Combin., 60:124--134, 2017) settled the first constant upper bound for the problem to 328 colors. In this paper, using a combination of existing results, we present an improvement of the bounds for bipartite graphs and general graphs, setting the best upper bounds to 7 and 220, respectively. In addition, we also prove that 4 colors suffice for locally irregular edge-coloring of any subcubic graph.