Maximal surface area of polytopes with respect to log-concave rotation invariant measures

Abstract

It was shown in GL that the maximal surface area of a convex set in Rn with respect to a rotation invariant log-concave probability measure γ is of order n[4]Var|X| E|X|, where X is a random vector in Rn distributed with respect to γ. In the present paper we discuss surface area of convex polytopes PK with K facets. We find tight bounds on the maximal surface area of PK in terms of K. We show that γ(∂ PK) nE|X|· K· n for all K. This bound is better then the general bound for all K∈ [2,ecVar|X|]. Moreover, for all K in that range the bound is exact up to a factor of n: for each K∈ [2,ecVar|X|] there exists a polytope PK with at most K facets such that γ(∂ PK) nE|X| K. %For the measures γp with densities Cn,p e-|y|pp (where p>0) we obtain: γp(∂ PK) nEX K, which was obtained for the standard Gaussian measure γ2 by F. Nazarov.