Maximum edge colouring problem on graphs that exclude a fixed minor
Abstract
The maximum edge colouring problem considers the maximum colour assignment to edges of a graph under the condition that every vertex has at most a fixed number of distinct coloured edges incident on it. If that fixed number is we call the colouring a maximum edge -colouring. The problem models a non-overlapping frequency channel assignment question on wireless networks. The problem has also been studied from a purely combinatorial perspective in the graph theory literature. We study the question when the input graph is sparse. We show the problem remains -hard on -apex graphs. We also show that there exists for the problem on minor-free graphs. The is based on a recently developed Baker game technique for proper minor-closed classes, thus avoiding the need to use any involved structural results. This further pushes the Baker game technique beyond the problems expressible in the first-order logic.
Cite
@article{arxiv.2307.02314,
title = {Maximum edge colouring problem on graphs that exclude a fixed minor},
author = {Zdeněk Dvořák and Abhiruk Lahiri},
journal= {arXiv preprint arXiv:2307.02314},
year = {2023}
}
Comments
10 pages, to appear in the proceedings of WG 2023