Clustered Colouring of Odd-H-Minor-Free Graphs
Abstract
The clustered chromatic number of a graph class G is the minimum integer c such that every graph G∈G has a c-colouring where each monochromatic component in G has bounded size. We study the clustered chromatic number of graph classes GHodd defined by excluding a graph H as an odd-minor. How does the structure of H relate to the clustered chromatic number of GHodd? We adapt a proof method of Norin, Scott, Seymour and Wood (2019) to show that the clustered chromatic number of GHodd is tied to the tree-depth of H.
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