Bounding generalized coloring numbers of planar graphs using coin models

Abstract

We study Koebe orderings of planar graphs: vertex orderings obtained by modelling the graph as the intersection graph of pairwise internally-disjoint discs in the plane, and ordering the vertices by non-increasing radii of the associated discs. We prove that for every d∈ N, any such ordering has d-admissibility bounded by O(d/ d) and weak d-coloring number bounded by O(d4 d). This in particular shows that the d-admissibility of planar graphs is bounded by O(d/ d), which asymptotically matches a known lower bound due to Dvor\'ak and Siebertz.