The Dominating 4-Colour Theorem
Abstract
A "dominating Kt-model" in a graph G is a sequence (T1,…,Tt) of pairwise vertex-disjoint connected subgraphs of G, such that whenever 1≤ i<j≤ t every vertex in Tj has a neighbour in Ti. Replacing "every vertex in Tj" by "some vertex in Tj" retrieves the standard definition of Kt-model, which is equivalent to a Kt-minor in G. We prove that every graph with no dominating K5-model is 4-colourable. This generalises and is significantly stronger than the 4-colour theorem for planar graphs or for graphs with no K5-minor. It also makes progress towards Haj\'os' conjecture on K5-subdivisions in 5-chromatic graphs.
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