The min-max edge q-coloring problem
Abstract
In this paper we introduce and study a new problem named \emph{min-max edge -coloring} which is motivated by applications in wireless mesh networks. The input of the problem consists of an undirected graph and an integer . The goal is to color the edges of the graph with as many colors as possible such that: (a) any vertex is incident to at most different colors, and (b) the maximum size of a color group (i.e. set of edges identically colored) is minimized. We show the following results: 1. Min-max edge -coloring is NP-hard, for any . 2. A polynomial time exact algorithm for min-max edge -coloring on trees. 3. Exact formulas of the optimal solution for cliques and almost tight bounds for bicliques and hypergraphs. 4. A non-trivial lower bound of the optimal solution with respect to the average degree of the graph. 5. An approximation algorithm for planar graphs.
Keywords
Cite
@article{arxiv.1302.3404,
title = {The min-max edge q-coloring problem},
author = {Tommi Larjomaa and Alexandru Popa},
journal= {arXiv preprint arXiv:1302.3404},
year = {2013}
}
Comments
16 pages, 5 figures