Weak coloring numbers of minor-closed graph classes

Abstract

We study the growth rate of weak coloring numbers of graphs excluding a fixed graph as a minor. Van den Heuvel et al. (European J. of Combinatorics, 2017) showed that for a fixed graph X, the maximum r-th weak coloring number of X-minor-free graphs is polynomial in r. We determine this polynomial up to a factor of O(r r). Moreover, we tie the exponent of the polynomial to a structural property of X, namely, 2-treedepth. As a result, for a fixed graph X and an X-minor-free graph G, we show that wcolr(G)= O(rtd(X)-1log\ r), which improves on the bound wcolr(G) = O(rg(td(X))) given by Dujmovi\'c et al. (SODA, 2024), where g is an exponential function. In the case of planar graphs of bounded treewidth, we show that the maximum r-th weak coloring number is in O(r2log\ r), which is best possible.

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