On maximal hyperplane sections of the unit ball of lp for p>2

Abstract

The maximal hyperplane section of the l∞n-ball, i.e. of the n-cube, is the one perpendicular to 1/sqrt 2 (1,1,0, ... ,0), as shown by Ball. Eskenazis, Nayar and Tkocz extended this result to the lpn-balls for very large p 1015. By Oleszkiewicz, Ball's result does not transfer to lpn for 2 < p < p0 26.265. Then the hyperplane section perpendicular to the main diagonal yields a counterexample for large dimensions n. We show that the analogue of Ball's result holds in lpn-balls for all hyperplanes with normal unit vectors a, if all coordinates of a have modulus 1 2 and p has distance 2-p to the even integers. Under similar assumptions, we give a Gaussian upper bound for 20 < p < p0.