Notes on Tree- and Path-chromatic Number
Abstract
Tree-chromatic number is a chromatic version of treewidth, where the cost of a bag in a tree-decomposition is measured by its chromatic number rather than its size. Path-chromatic number is defined analogously. These parameters were introduced by Seymour (JCTB 2016). In this paper, we survey all the known results on tree- and path-chromatic number and then present some new results and conjectures. In particular, we propose a version of Hadwiger's Conjecture for tree-chromatic number. As evidence that our conjecture may be more tractable than Hadwiger's Conjecture, we give a short proof that every -minor-free graph has tree-chromatic number at most , which avoids the Four Colour Theorem. We also present some hardness results and conjectures for computing tree- and path-chromatic number.
Cite
@article{arxiv.2002.05363,
title = {Notes on Tree- and Path-chromatic Number},
author = {Tony Huynh and Bruce Reed and David R. Wood and Liana Yepremyan},
journal= {arXiv preprint arXiv:2002.05363},
year = {2020}
}
Comments
11 pages, 0 figures