3-Colouring Graphs Excluding a Fixed Minor
Abstract
We show that, for every fixed graph H, every n-vertex graph G that excludes H as a minor is 3-colourable with clustering OH(n4/9). That is, there exists a function f such that for every graph H, every n 1, every n-vertex graph G that excludes H as a minor has a vertex colouring with 3 colours in which each monochromatic component has size at most f(H)· n4/9. This generalizes a recent result of Dujmović, Morin, Norin, and Wood (arXiv:2507.03163) from planar graphs to all proper minor-closed graph classes and is the first improvement on clustered 3-colouring of proper minor-closed graph classes since the upper bound of OH(n) due to Linial, Matoušek, Sheffet, and Tardos (Comb. Prob. Comput., 17(4):577--589, 2008).
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