Precoloring extension of Vizing's Theorem for multigraphs

Abstract

Let G be a graph with maximum degree (G) and maximum multiplicity μ(G). Vizing and Gupta, independently, proved in the 1960s that the chromatic index of G is at most (G)+μ(G). The distance between two edges e and f in G is the length of a shortest path connecting an endvertex of e and an endvertex of f. A distance-t matching is a set of edges having pairwise distance at least t. Edwards et al. proposed the following conjecture: For any graph G, using the palette \1, …, (G)+μ(G)\, any precoloring on a distance-2 matching can be extended to a proper edge coloring of G. Gir\~ao and Kang verified this conjecture for distance-9 matchings. In this paper, we improve the required distance from 9 to 3 for multigraphs G with μ(G) 2.