On hyperplane sections and projections in lpn

Abstract

For 2 < p < p0 26.265, the hyperplane section of the lpn-unit ball Bpn perpendicular to a(n) = 1/sqrt(n) (1, ... ,1) for large n has larger volume than the one orthogonal to a(2) = 1/sqrt(2) (1,1,0, ...,0), as shown by Oleszkiewicz. This is different from the case of l∞n considered by Ball. We give a quantitative estimate for which dimensions n this happens, namely for n > c ( 1 p0-p + 1 p-2) for some absolute constant c>0. Correspondingly for projections of Bqn onto hyperplanes, Barthe and Naor showed that projections onto hyperplanes perpendicular to a(n) have smaller volume for large n than onto the one orthogonal to a(2), if 4 3 < q < 2, different from the case q=1. We show that this happens for all n > 5 ( 1 q- 4 3 + 1 2-q).