English

On the largest empty axis-parallel box amidst $n$ points

Computational Geometry 2009-11-23 v2

Abstract

We give the first nontrivial upper and lower bounds on the maximum volume of an empty axis-parallel box inside an axis-parallel unit hypercube in \RRd\RR^d containing nn points. For a fixed dd, we show that the maximum volume is of the order Θ(1n)\Theta(\frac{1}{n}). We then use the fact that the maximum volume is Ω(1n)\Omega(\frac{1}{n}) in our design of the first efficient (1\eps)(1-\eps)-approximation algorithm for the following problem: Given an axis-parallel dd-dimensional box RR in \RRd\RR^d containing nn points, compute a maximum-volume empty axis-parallel dd-dimensional box contained in RR. The running time of our algorithm is nearly linear in nn, for small dd, and increases only by an O(logn)O(\log{n}) factor when one goes up one dimension. No previous efficient exact or approximation algorithms were known for this problem for d4d \geq 4. As the problem has been recently shown to be NP-hard in arbitrary high dimensions (i.e., when dd is part of the input), the existence of efficient exact algorithms is unlikely. We also obtain tight estimates on the maximum volume of an empty axis-parallel hypercube inside an axis-parallel unit hypercube in \RRd\RR^d containing nn points. For a fixed dd, this maximum volume is of the same order order Θ(1n)\Theta(\frac{1}{n}). A faster (1\eps)(1-\eps)-approximation algorithm, with a milder dependence on dd in the running time, is obtained in this case.

Keywords

Cite

@article{arxiv.0909.3127,
  title  = {On the largest empty axis-parallel box amidst $n$ points},
  author = {Adrian Dumitrescu and Minghui Jiang},
  journal= {arXiv preprint arXiv:0909.3127},
  year   = {2009}
}

Comments

19 pages, 2 figures

R2 v1 2026-06-21T13:47:21.804Z