Three-term idempotent counterexamples in the Hardy-Littlewood majorant problem

Abstract

The Hardy-Littlewood majorant problem was raised in the 30's and it can be formulated as the question whether ∫ |f|p ∫|g|p whenever f| g|. It has a positive answer only for exponents p which are even integers. Montgomery conjectured that even among the idempotent polynomials there must exist some counterexamples, i.e. there exists some finite set of exponentials and some signs with which the signed exponential sum has larger p th norm than the idempotent obtained with all the signs chosen + in the exponential sum. That conjecture was proved recently by Mockenhaupt and Schlag. Their construction was used by Bonami and R\'ev\'esz to find analogous examples among bivariate idempotents, which were in turn used to show integral concentration properties of univariate idempotents.However, a natural question is if even the classical 1+e2π i x e2π i (k+2)x three-term exponential sums, used for p=3 and k=1 already by Hardy and Littlewood, should work in this respect. That remained unproved, as the construction of Mockenhaupt and Schlag works with four-term idempotents. We investigate the sharpened question and show that at least in certain cases there indeed exist three-term idempotent counterexamples in the Hardy-Littlewood majorant problem; that is we have for 0<p<6, p 2 ∫012|1+e2π ix-e2π i([ p2]+2)x|p > ∫012|1+e2π ix+e2π i([ p2]+2)x|p. The proof combines delicate calculus with numerical integration and precise error estimates.