English

Upper bounds for stabbing simplices by a line

Computational Geometry 2021-07-01 v2 Combinatorics

Abstract

It is known that for every dimension d2d\ge 2 and every k<dk<d there exists a constant cd,k>0c_{d,k}>0 such that for every nn-point set XRdX\subset \mathbb R^d there exists a kk-flat that intersects at least cd,knd+1ko(nd+1k)c_{d,k} n^{d+1-k} - o(n^{d+1-k}) of the (dk)(d-k)-dimensional simplices spanned by XX. However, the optimal values of the constants cd,kc_{d,k} are mostly unknown. The case k=0k=0 (stabbing by a point) has received a great deal of attention. In this paper we focus on the case k=1k=1 (stabbing by a line). Specifically, we try to determine the upper bounds yielded by two point sets, known as the "stretched grid" and the "stretched diagonal". Even though the calculations are independent of nn, they are still very complicated, so we resort to analytical and numerical software methods. We provide strong evidence that, surprisingly, for d=4,5,6d=4,5,6 the stretched grid yields better bounds than the stretched diagonal (unlike for all cases k=0k=0 and for the case (d,k)=(3,1)(d,k)=(3,1), in which both point sets yield the same bound). Our experiments indicate that the stretched grid yields c4,10.00457936c_{4,1}\leq 0.00457936, c5,10.000405335c_{5,1}\leq 0.000405335, and c6,10.0000291323c_{6,1}\leq 0.0000291323.

Cite

@article{arxiv.2001.00782,
  title  = {Upper bounds for stabbing simplices by a line},
  author = {Inbar Daum-Sadon and Gabriel Nivasch},
  journal= {arXiv preprint arXiv:2001.00782},
  year   = {2021}
}

Comments

18 pages, 3 figures

R2 v1 2026-06-23T13:02:09.877Z