English

Local certification of geometric graph classes

Discrete Mathematics 2026-02-25 v5 Computational Geometry Distributed, Parallel, and Cluster Computing Combinatorics

Abstract

The goal of local certification is to locally convince the vertices of a graph GG that GG satisfies a given property. A prover assigns short certificates to the vertices of the graph, then the vertices are allowed to check their certificates and the certificates of their neighbors, and based only on this local view, they must decide whether GG satisfies the given property. If the graph indeed satisfies the property, all vertices must accept the instance, and otherwise at least one vertex must reject the instance (for any possible assignment of certificates). The goal is to minimize the size of the certificates. In this paper we study the local certification of geometric and topological graph classes. While it is known that in nn-vertex graphs, planarity can be certified locally with certificates of size O(logn)O(\log n), we show that several closely related graph classes require certificates of size Ω(n)\Omega(n). This includes penny graphs, unit-distance graphs, (induced) subgraphs of the square grid, 1-planar graphs, and unit-square graphs. These bounds are tight up to a constant factor and give the first known examples of hereditary (and even monotone) graph classes for which the certificates must have linear size. For unit-disk graphs we obtain a lower bound of Ω(n1δ)\Omega(n^{1-\delta}) for any δ>0\delta>0 on the size of the certificates, and an upper bound of O(nlogn)O(n \log n). The lower bounds are obtained by proving rigidity properties of the considered graphs, which might be of independent interest.

Keywords

Cite

@article{arxiv.2311.16953,
  title  = {Local certification of geometric graph classes},
  author = {Oscar Defrain and Louis Esperet and Aurélie Lagoutte and Pat Morin and Jean-Florent Raymond},
  journal= {arXiv preprint arXiv:2311.16953},
  year   = {2026}
}

Comments

38 pages, 20 figures; v5: version revised according to the reviewers comments

R2 v1 2026-06-28T13:34:23.364Z