English

A note on piercing discrete rectangles

Combinatorics 2026-04-07 v1

Abstract

In 2008, Halman proved a discrete Helly-type theorem for axis-parallel boxes in Rd\mathbb R^d. Very recently, this result was extended to the (p,q)(p,q) setting with pqd+1p \geq q \geq d+1 by Edwards and Sober\'on, and subsequently to the case pq2p \geq q \geq 2 by Gangopadhyay, Polyanskii, and the author of this paper. In this paper, we obtain improved bounds for the (p,q)(p,q) problem in the case q=2q=2 and d=2d=2. More precisely, our main result asserts that for any integer p2p \geq 2, any set PR2P \subseteq \mathbb R^2, and any finite family B\mathcal B of axis-parallel rectangles in R2\mathbb R^2 such that every rectangle contains a point of PP, if among every pp rectangles there exist two whose intersection contains a point of PP, then there exists a subset SPS \subseteq P of size at most O ⁣((ploglogp)2)O\!\bigl( (p \log \log p)^2 \bigr) such that every rectangle contains a point of SS. Moreover, when p=2p=2, the size of SS can be bounded by 88.

Keywords

Cite

@article{arxiv.2604.04024,
  title  = {A note on piercing discrete rectangles},
  author = {Wei Rao},
  journal= {arXiv preprint arXiv:2604.04024},
  year   = {2026}
}
R2 v1 2026-07-01T11:54:20.571Z