A dimension-free discrete Remez-type inequality on the polytorus

Abstract

Consider f:nK C a function from the n-fold product of multiplicative cyclic groups of order K. Any such f may be extended via its Fourier expansion to an analytic polynomial on the polytorus Tn, and the set of such polynomials coincides with the set of all analytic polynomials on Tn of individual degree at most K-1. In this setting it is natural to ask how the supremum norms of f over Tn and over Kn compare. We prove the following discretization of the uniform norm for low-degree polynomials: if f has degree at most d as an analytic polynomial, then \|f\|Tn≤ C(d,K)\|f\|_Kn with C(d,K) independent of dimension n. As a consequence we also obtain a new proof of the Bohnenblust--Hille inequality for functions on products of cyclic groups. Key to our argument is a special class of Fourier multipliers on Kn which are L∞ L∞ bounded independent of dimension when restricted to low-degree polynomials. This class includes projections onto the k-homogeneous parts of low-degree polynomials as well as projections of much finer granularity.