Tight bounds on the Fourier growth of bounded functions on the hypercube

Abstract

We give tight bounds on the degree homogenous parts f of a bounded function f on the cube. We show that if f: \ 1\n → [-1,1] has degree d, then \| f \|∞ is bounded by d/!, and \| f \|1 is bounded by d e+12 n-12. We describe applications to pseudorandomness and learning theory. We use similar methods to generalize the classical Pisier's inequality from convex analysis. Our analysis involves properties of real-rooted polynomials that may be useful elsewhere.