On the average volume of sections of convex bodies

TL;DR

This paper investigates the average volume of hyperplane sections of convex bodies, relating it to the hyperplane conjecture and exploring bounds involving isotropic constants and volume ratios.

Contribution

It establishes bounds for the average section functional in terms of isotropic constants and volume ratios, extending understanding of the hyperplane conjecture.

Findings

The inequality holds with constants involving $L_K$ and $d_{ovr}(K,\mathcal{BP}_k^n)$.

Connections between average section functional and the hyperplane conjecture are clarified.

Analysis of constants' dependence on dimension in various positions of $K$.

Abstract

The average section functional ${\rm as}(K)$ of a centered convex body in ${\mathbb R}^n$ is the average volume of central hyperplane sections of $K$: \begin{equation*}{\rm as}(K)=\int_{S^{n-1}}|K\cap \xi^{\perp }|\,d\sigma (\xi ).\end{equation*} We study the question if there exists an absolute constant $C>0$ such that for every $n$, for every centered convex body $K$ in ${\mathbb R}^n$ and for every 0<k<n, $${\rm as}(K)\ls C^k|K|^{\frac{k}{n}}\,\max_{E\in {\rm Gr}_{n-k}}{\rm as}(K\cap E).$$ We observe that the case $k=1$ is equivalent to the hyperplane conjecture. We show that this inequality holds true in full generality if one replaces $C$ by $CL_K$ or $Cd_{\rm ovr}(K,{\cal{BP}}_k^n)$, where $L_K$ is the isotropic constant of $K$ and $d_{\rm ovr}(K,{\cal{BP}}_k^n)$ is the outer volume ratio distance from $K$ to the class ${\cal{BP}}_k^n$ of generalized $k$-intersection bodies. We also compare ${\rm as}(K)$ to the average of ${\rm as}(K\cap E)$ over all $k$-codimensional sections of $K$. We examine separately the dependence of the constants on the dimension in the case where $K$ is in some of the classical positions as well as the natural lower dimensional analogue of the average section functional.