A note on bounded exponential sums

Abstract

Let A⊂N, α∈(0,1), and for x∈R let e(x):=e2π ix. We set SA(α,N):=Σn∈ A≤ Ne(nα). Recently, Lambert A'Campo proposed the following question: is there an infinite non-cofinite set A⊂N such that for all α∈(0,1) the sum SA(α,N) has bounded modulus as N +∞? In this note we show that such sets do not exist. To do so, we use a theorem by Duffin and Schaeffer on complex power series. We extend our result by proving that if the sum SA(α,N) is bounded in modulus on an arbitrarily small interval and on the set of rational points, then the set A has to be either finite or cofinite. On the other hand, we show that there are infinite non-cofinite sets A such that |SA(α,N)| is bounded for all α∈ E⊂ (0,1), where E has full Hausdorff dimension and Q (0,1)⊂ E.