English

On Lines Crossing Pairwise Intersecting Convex Sets in Three Dimensions

Combinatorics 2026-01-27 v1 Computational Geometry

Abstract

The 1913 Helly's theorem states that any family K{\cal K} of nd+1n\geq d+1 convex sets in Rd{\mathbb R}^d can be pierced by a single point if and only if any d+1d+1 of K{\cal K}'s elements can. In 2002 Alon, Kalai, Matou\v{s}ek and Meshulam ruled out the possibility of similar criteria for the existence of lines crossing multiple convex sets in dimension d3d\geq 3 -- for any k3k\geq 3, they described arbitrary large families K{\cal K} of convex sets in R3{\mathbb R}^3 so that any kk elements of K{\cal K} can be crossed by a line yet no k+4k+4 of them can. Let K{\cal K} be a family of nn pairwise intersecting convex sets in R3{\mathbb R}^3. We show that there exists a line crossing Θ(n)\Theta(n) elements of K{\cal K}. This resolves the most extensively studied variant of a problem by Mart\'inez, Rold\'an-Pensado and Rubin (Discrete Comput. Geom. 2020) which was highlighted by B\'ar\'any and Kalai (Bull. Amer. Math. Soc. 2021). Our result adds to the very few sufficient (and non-trivial) conditions that have been known for the existence of line transversals to large families of convex sets. Our argument is based on a Ramsey-type result of independent interest for families of pairwise intersecting convex sets in R2{\mathbb R}^2, and the structure of line arrangements in R3{\mathbb R}^3.

Keywords

Cite

@article{arxiv.2601.17913,
  title  = {On Lines Crossing Pairwise Intersecting Convex Sets in Three Dimensions},
  author = {Natan Rubin},
  journal= {arXiv preprint arXiv:2601.17913},
  year   = {2026}
}

Comments

A preliminary version appeared in the Proceeding of SODA 2026

R2 v1 2026-07-01T09:19:17.971Z