English

Discrepancy and Sparsity

Discrete Mathematics 2021-11-30 v3 Logic in Computer Science Combinatorics Logic

Abstract

We study the connections between the notions of combinatorial discrepancy and graph degeneracy. In particular, we prove that the maximum discrepancy over all subgraphs HH of a graph GG of the neighborhood set system of HH is sandwiched between Ω(logdeg(G))\Omega(\log\mathrm{deg}(G)) and O(deg(G))\mathcal{O}(\mathrm{deg}(G)), where deg(G)\mathrm{deg}(G) denotes the degeneracy of GG. We extend this result to inequalities relating weak coloring numbers and discrepancy of graph powers and deduce a new characterization of bounded expansion classes. Then, we switch to a model theoretical point of view, introduce pointer structures, and study their relations to graph classes with bounded expansion. We deduce that a monotone class of graphs has bounded expansion if and only if all the set systems definable in this class have bounded hereditary discrepancy. Using known bounds on the VC-density of set systems definable in nowhere dense classes we also give a characterization of nowhere dense classes in terms of discrepancy. As consequences of our results, we obtain a corollary on the discrepancy of neighborhood set systems of edge colored graphs, a polynomial-time algorithm to compute ε\varepsilon-approximations of size O(1/ε)\mathcal{O}(1/\varepsilon) for set systems definable in bounded expansion classes, an application to clique coloring, and even the non-existence of a quantifier elimination scheme for nowhere dense classes.

Keywords

Cite

@article{arxiv.2105.03693,
  title  = {Discrepancy and Sparsity},
  author = {Mario Grobler and Yiting Jiang and Patrice Ossona de Mendez and Sebastian Siebertz and Alexandre Vigny},
  journal= {arXiv preprint arXiv:2105.03693},
  year   = {2021}
}

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R2 v1 2026-06-24T01:54:09.972Z