Metric theory of lower bounds on Weyl sums

Abstract

We prove that the Hausdorff dimension of the set x∈ [0,1)d, such that |Σn=1N (2 π i(x1n+…+xd nd)) | c N1/2 holds for infinitely many natural numbers N, is at least d-1/2d for d 3 and at least 3/2 for d=2, where c is a constant depending only on d. This improves the previous lower bound of the first and third authors for d 3. We also obtain similar bounds for the Hausdorff dimension of the set of large sums with monomials xnd.