Approximate isoperimetry for convex polytopes
Abstract
For all with , the smallest possible isoperimetric quotient of an -dimensional convex polytope that has facets is shown to be bounded from above and from below by positive universal constant multiples of . For all and , it is shown that every -dimensional origin-symmetric convex polytope that has vertices admits an affine image whose isoperimetric quotient is at most a universal constant multiple of , which is sharp. The weak isomorphic reverse isoperimetry conjecture is proved for -dimensional convex polytopes that have facets by demonstrating that any such polytope has an image under a volume preserving matrix and a convex body such that the isoperimetric quotient of is at most a universal constant multiple of , and also is at least a positive universal constant.
Keywords
Cite
@article{arxiv.2509.13898,
title = {Approximate isoperimetry for convex polytopes},
author = {Keith Ball and Károly J. Böröczky and Assaf Naor},
journal= {arXiv preprint arXiv:2509.13898},
year = {2025}
}