English

Deep sections of the hypercube

Metric Geometry 2025-03-05 v2 Combinatorics Functional Analysis

Abstract

Consider a non-negative number tt and a hyperplane HH of Rd\mathbb{R}^d whose distance to the center of the hypercube [0,1]d[0,1]^d is tt. If tt is equal to 00 and HH is orthogonal to a diagonal of [0,1]d[0,1]^d, it is known that the (d1)(d-1)-dimensional volume of H[0,1]dH\cap[0,1]^d is a strictly increasing function of dd when dd is at least 33. The study of the monotonicity of this volume is extended for tt up to above 1/21/2 and, when dd is large enough, for every non-negative tt. In particular, a range for tt is identified such that this volume is a strictly decreasing function of dd over the positive integers. The local extremality of the (d1)(d-1)-dimensional volume of H[0,1]dH\cap[0,1]^d when HH is orthogonal to a diagonal of either [0,1]d[0,1]^d or a lower dimensional face is also determined for the same values of tt. It is shown for instance that when tt is above an explicit constant and dd is large enough, this volume is always strictly locally maximal when HH is orthogonal to a diagonal of [0,1]d[0,1]^d. A precise estimate for the convergence rate of the Eulerian numbers to their limit Gaussian behavior is provided along the way.

Keywords

Cite

@article{arxiv.2407.04637,
  title  = {Deep sections of the hypercube},
  author = {Lionel Pournin},
  journal= {arXiv preprint arXiv:2407.04637},
  year   = {2025}
}

Comments

48 pages

R2 v1 2026-06-28T17:30:31.995Z