Strong Edge-Coloring of Cubic Bipartite Graphs: A Counterexample

Abstract

A strong edge-coloring of a graph G assigns colors to edges of G such that (e1) (e2) whenever e1 and e2 are at distance no more than 1. It is equivalent to a proper vertex coloring of the square of the line graph of G. In 1990 Faudree, Schelp, Gy\'arf\'as, and Tuza conjectured that if G is a bipartite graph with maximum degree 3 and sufficiently large girth, then G has a strong edge-coloring with at most 5 colors. In 2021 this conjecture was disproved by Luzar, Macajov\'a, Skoviera, and Sot\'ak. Here we give an alternative construction to disprove the conjecture.

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