Deep sections of the hypercube
Abstract
Consider a non-negative number and a hyperplane of whose distance to the center of the hypercube is . If is equal to and is orthogonal to a diagonal of , it is known that the -dimensional volume of is a strictly increasing function of when is at least . The study of the monotonicity of this volume is extended for up to above and, when is large enough, for every non-negative . In particular, a range for is identified such that this volume is a strictly decreasing function of over the positive integers. The local extremality of the -dimensional volume of when is orthogonal to a diagonal of either or a lower dimensional face is also determined for the same values of . It is shown for instance that when is above an explicit constant and is large enough, this volume is always strictly locally maximal when is orthogonal to a diagonal of . A precise estimate for the convergence rate of the Eulerian numbers to their limit Gaussian behavior is provided along the way.
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