Centered colorings and weak coloring numbers in minor-closed graph classes
Abstract
Let C be a proper minor-closed class of graphs. Given the minors excluded in C, we determine the maximum q-centered chromatic number and the maximum qth weak coloring number of graphs in C within an O(q)-factor. Moreover, when C excludes a planar graph, we determine it within a constant factor. Our results imply that the q-centered chromatic number of Kt-minor-free graphs is in O(qt-1), improving on the previously known O(qh(t)) bound with a large and non-explicit function h. We include similar bounds for another family of parameters, the fractional treedepth fragility rates. All our bounds are proved via the same general framework.
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