Star 5-edge-colorings of subcubic multigraphs

Abstract

The star chromatic index of a multigraph G, denoted 's(G), is the minimum number of colors needed to properly color the edges of G such that no path or cycle of length four is bi-colored. A multigraph G is star k-edge-colorable if 's(G) k. Dvor\'ak, Mohar and S\'amal [Star chromatic index, J Graph Theory 72 (2013), 313--326] proved that every subcubic multigraph is star 7-edge-colorable, and conjectured that every subcubic multigraph should be star 6-edge-colorable. Kerdjoudj, Kostochka and Raspaud considered the list version of this problem for simple graphs and proved that every subcubic graph with maximum average degree less than 7/3 is star list-5-edge-colorable. It is known that a graph with maximum average degree 14/5 is not necessarily star 5-edge-colorable. In this paper, we prove that every subcubic multigraph with maximum average degree less than 12/5 is star 5-edge-colorable.