On the generalized coloring numbers
Abstract
The \emph{coloring number} of a graph , which is equal to the \emph{degeneracy} of plus one, provides a very useful measure for the uniform sparsity of . The coloring number is generalized by three series of measures, the \emph{generalized coloring numbers}. These are the \emph{-admissibility} , the \emph{strong -coloring number} and the \emph{weak -coloring number} , where is an integer parameter. The generalized coloring numbers measure the edge density of bounded-depth minors and thereby provide an even more uniform measure of sparsity of graphs. They have found many applications in graph theory and in particular play a key role in the theory of bounded expansion and nowhere dense graph classes introduced by Ne\v{s}et\v{r}il and Ossona de Mendez. We overview combinatorial and algorithmic applications of the generalized coloring numbers, emphasizing new developments in this area. We also present a simple proof for the existence of uniform orders and improve known bounds, e.g., for the weak coloring numbers on graphs with excluded topological minors.
Keywords
Cite
@article{arxiv.2501.08698,
title = {On the generalized coloring numbers},
author = {Sebastian Siebertz},
journal= {arXiv preprint arXiv:2501.08698},
year = {2025}
}