On the average volume of sections of convex bodies

Abstract

The average section functional as(K) of a centered convex body in Rn is the average volume of central hyperplane sections of K: equation* as(K)=∫Sn-1|K |\,dσ ( ).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 Rn and for every 0<k<n, as(K) Ck|K|kn\,E∈ Grn-k as(K 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 CLK or Cd ovr(K,BPkn), where LK is the isotropic constant of K and d ovr(K,BPkn) is the outer volume ratio distance from K to the class BPkn of generalized k-intersection bodies. We also compare as(K) to the average of as(K 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.