Sections of the regular simplex - Volume formulas and estimates
Metric Geometry
2019-11-21 v2
Abstract
We state a general formula to compute the volume of the intersection of the regular -simplex with some -dimensional subspace. It is known that for central hyperplanes the one through the centroid containing vertices gives the maximal volume. We show that, for fixed small distances of a hyperplane to the centroid, the hyperplane containing vertices is still volume maximizing. The proof also yields a new and short argument for the result on central sections. With the same technique we give a partial result for the minimal central hyperplane section. Finally, we obtain a bound for -dimensional sections.
Cite
@article{arxiv.1509.06408,
title = {Sections of the regular simplex - Volume formulas and estimates},
author = {Hauke Dirksen},
journal= {arXiv preprint arXiv:1509.06408},
year = {2019}
}
Comments
Revised version: new results added (Sections 4 and 5); improvements and corrections in the first sections