The Dominating 4-Colour Theorem
Combinatorics
2026-05-12 v1 Discrete Mathematics
Abstract
A "dominating -model" in a graph is a sequence of pairwise vertex-disjoint connected subgraphs of , such that whenever every vertex in has a neighbour in . Replacing "every vertex in " by "some vertex in " retrieves the standard definition of -model, which is equivalent to a -minor in . We prove that every graph with no dominating -model is -colourable. This generalises and is significantly stronger than the 4-colour theorem for planar graphs or for graphs with no -minor. It also makes progress towards Haj\'{o}s' conjecture on -subdivisions in -chromatic graphs.
Cite
@article{arxiv.2605.10112,
title = {The Dominating 4-Colour Theorem},
author = {António Girão and Freddie Illingworth and Bojan Mohar and Sergey Norin and Raphael Steiner and Youri Tamitegama and Jane Tan and David R. Wood and Jung Hon Yip},
journal= {arXiv preprint arXiv:2605.10112},
year = {2026}
}