Colouring graphs with constraints on connectivity
Abstract
A graph has maximal local edge-connectivity if the maximum number of edge-disjoint paths between every pair of distinct vertices and is at most . We prove Brooks-type theorems for -connected graphs with maximal local edge-connectivity , and for any graph with maximal local edge-connectivity 3. We also consider several related graph classes defined by constraints on connectivity. In particular, we show that there is a polynomial-time algorithm that, given a 3-connected graph with maximal local connectivity 3, outputs an optimal colouring for . On the other hand, we prove, for , that -colourability is NP-complete when restricted to minimally -connected graphs, and 3-colourability is NP-complete when restricted to -connected graphs with maximal local connectivity . Finally, we consider a parameterization of -colourability based on the number of vertices of degree at least , and prove that, even when is part of the input, the corresponding parameterized problem is FPT.
Cite
@article{arxiv.1505.01616,
title = {Colouring graphs with constraints on connectivity},
author = {Pierre Aboulker and Nick Brettell and Frédéric Havet and Dániel Marx and Nicolas Trotignon},
journal= {arXiv preprint arXiv:1505.01616},
year = {2022}
}
Comments
The latest version has minor corrections and clarifications