Strong Majority Edge-Coloring

Abstract

A strong majority edge-coloring of a graph is an edge-coloring in which, for every edge e and every color i, at most half of the edges adjacent to e have color i. Such a coloring exists only for graphs with no pendant path of length two, which, following Kalinowski, Kamyczura, Pilśniak, and Woźniak, we call admissible. They proved that every admissible graph admits such a coloring with at most eight colors and conjectured that four colors always suffice. We improve the upper bound from eight to five.

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