On the oscillation rigidity of a Lipschitz function on a high-dimensional flat torus

Abstract

Given an arbitrary 1-Lipschitz function f on the torus Tn , we find a k-dimensional subtorus M ⊂eq Tn, parallel to the axes, such that the restriction of f to the subtorus M is nearly a constant function. The k-dimensional subtorus M is chosen randomly and uniformly. We show that when k ≤ c n / ( n + 1/), the maximum and the minimum of f on this random subtorus M differ by at most , with high probability.