English

On largest volume simplices and sub-determinants

Computational Geometry 2014-06-16 v1

Abstract

We show that the problem of finding the simplex of largest volume in the convex hull of nn points in Qd\mathbb{Q}^d can be approximated with a factor of O(logd)d/2O(\log d)^{d/2} in polynomial time. This improves upon the previously best known approximation guarantee of d(d1)/2d^{(d-1)/2} by Khachiyan. On the other hand, we show that there exists a constant c>1c>1 such that this problem cannot be approximated with a factor of cdc^d, unless P=NPP=NP. % This improves over the 1.091.09 inapproximability that was previously known. Our hardness result holds even if n=O(d)n = O(d), in which case there exists a cˉd\bar c\,^{d}-approximation algorithm that relies on recent sampling techniques, where cˉ\bar c is again a constant. We show that similar results hold for the problem of finding the largest absolute value of a subdeterminant of a d×nd\times n matrix.

Keywords

Cite

@article{arxiv.1406.3512,
  title  = {On largest volume simplices and sub-determinants},
  author = {Marco Di Summa and Friedrich Eisenbrand and Yuri Faenza and Carsten Moldenhauer},
  journal= {arXiv preprint arXiv:1406.3512},
  year   = {2014}
}
R2 v1 2026-06-22T04:37:57.473Z