The tight bound for the strong chromatic indices of claw-free subcubic graphs

Abstract

Let G be a graph and k a positive integer. A strong k-edge-coloring of G is a mapping φ: E(G) \1,2,…,k\ such that for any two edges e and e' that are either adjacent to each other or adjacent to a common edge, φ(e)≠ φ(e'). The strong chromatic index of G, denoted as 's(G), is the minimum integer k such that G has a strong k-edge-coloring. Lv, Li and Zhang [Graphs and Combinatorics 38 (3) (2022) 63] proved that if G is a claw-free subcubic graph other than the triangular prism then s'(G) 8. In addition, they asked if the upper bound 8 can be improved to 7. In this paper, we answer this question in the affirmative. Our proof implies a linear-time algorithm for finding strong 7-edge-colorings of such graphs. We also construct infinitely many claw-free subcubic graphs with their strong chromatic indices attaining the bound 7.

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