English

Well-Separation and Hyperplane Transversals in High Dimensions

Computational Geometry 2022-09-07 v1

Abstract

A family of kk point sets in dd dimensions is well-separated if the convex hulls of any two disjoint subfamilies can be separated by a hyperplane. Well-separation is a strong assumption that allows us to conclude that certain kinds of generalized ham-sandwich cuts for the point sets exist. But how hard is it to check if a given family of high-dimensional point sets has this property? Starting from this question, we study several algorithmic aspects of the existence of transversals and separations in high-dimensions. First, we give an explicit proof that kk point sets are well-separated if and only if their convex hulls admit no (k2)(k - 2)-transversal, i.e., if there exists no (k2)(k - 2)-dimensional flat that intersects the convex hulls of all kk sets. It follows that the task of checking well-separation lies in the complexity class coNP. Next, we show that it is NP-hard to decide whether there is a hyperplane-transversal (that is, a (d1)(d - 1)-transversal) of a family of d+1d + 1 line segments in Rd\mathbb{R}^d, where dd is part of the input. As a consequence, it follows that the general problem of testing well-separation is coNP-complete. Furthermore, we show that finding a hyperplane that maximizes the number of intersected sets is NP-hard, but allows for an Ω(logkkloglogk)\Omega\left(\frac{\log k}{k \log \log k}\right)-approximation algorithm that is polynomial in dd and kk, when each set consists of a single point. When all point sets are finite, we show that checking whether there exists a (k2)(k - 2)-transversal is in fact strongly NP-complete.

Keywords

Cite

@article{arxiv.2209.02319,
  title  = {Well-Separation and Hyperplane Transversals in High Dimensions},
  author = {Helena Bergold and Daniel Bertschinger and Nicolas Grelier and Wolfgang Mulzer and Patrick Schnider},
  journal= {arXiv preprint arXiv:2209.02319},
  year   = {2022}
}

Comments

14 pages, 1 figure; a preliminary version appeared in SWAT 2022

R2 v1 2026-06-28T00:47:06.588Z