On a problem of Bourgain concerning the L1-norm of exponential sums

Abstract

Bourgain posed the problem of calculating = n ≥ 1 ~k1 <... < kn 1n\| Σj=1n e2 π i kj θ\|L1([0,1]). It is clear that ≤ 1; beyond that, determining whether < 1 or =1 would have some interesting implications, for example concerning the problem whether all rank one transformations have singular maximal spectral type. In the present paper we prove ≥ π/2 ≈ 0.886, by this means improving a result of Karatsuba. For the proof we use a quantitative two-dimensional version of the central limit theorem for lacunary trigonometric series, which in its original form is due to Salem and Zygmund.