Coloring hypergraphs with excluded minors
Abstract
Hadwiger's conjecture, among the most famous open problems in graph theory, states that every graph that does not contain as a minor is properly -colorable. The purpose of this work is to demonstrate that a natural extension of Hadwiger's problem to hypergraph coloring exists, and to derive some first partial results and applications. Generalizing ordinary graph minors to hypergraphs, we say that a hypergraph is a minor of a hypergraph , if a hypergraph isomorphic to can be obtained from via a finite sequence of vertex- and hyperedge-deletions, and hyperedge contractions. We first show that a weak extension of Hadwiger's conjecture to hypergraphs holds true: For every , there exists a finite (smallest) integer such that every hypergraph with no -minor is -colorable, and we prove where denotes the maximum chromatic number of graphs with no -minor. Using the recent result by Delcourt and Postle that , this yields . We further conjecture that , i.e., that every hypergraph with no -minor is -colorable for all , and prove this conjecture for all hypergraphs with independence number at most . By considering special classes of hypergraphs, the above additionally has some interesting applications for ordinary graph coloring, such as: -graphs of chromatic number contain -minors with -edge-connected branch-sets, -graphs of chromatic number contain -minors with modulo--connected branch sets, -by considering cycle hypergraphs of digraphs we recover known results on strong minors in digraphs of large dichromatic number as special cases.
Cite
@article{arxiv.2206.13635,
title = {Coloring hypergraphs with excluded minors},
author = {Raphael Steiner},
journal= {arXiv preprint arXiv:2206.13635},
year = {2024}
}
Comments
15 pages, Final version, revised according to the reviewer's comments