On star edge colorings of bipartite and subcubic graphs

Abstract

A star edge coloring of a graph is a proper edge coloring with no 2-colored path or cycle of length four. The star chromatic index 'st(G) of G is the minimum number t for which G has a star edge coloring with t colors. We prove upper bounds for the star chromatic index of complete bipartite graphs; in particular we obtain tight upper bounds for the case when one part has size at most 3. We also consider bipartite graphs G where all vertices in one part have maximum degree 2 and all vertices in the other part has maximum degree b. Let k be an integer (k≥ 1), we prove that if b=2k+1 then 'st(G) ≤ 3k+2; and if b=2k, then 'st(G) ≤ 3k; both upper bounds are sharp. Finally, we consider the well-known conjecture that subcubic graphs have star chromatic index at most 6; in particular we settle this conjecture for cubic Halin graphs.