Riesz sequences and arithmetic progressions

Abstract

Given a set S of positive measure on the circle and a set of integers , one may consider the family of exponentials E():=\ eiλ t\λ∈ and ask whether it is a Riesz sequence in the space L2(S). We focus on this question in connection with some arithmetic properties of the set of frequencies. Improving a result of Bownik and Speegle, we construct a set S such that E() is never a Riesz sequence if contains arbitrary long arithmetic progressions of length N and step =O(N1-). On the other hand, we prove that every set S admits a Riesz sequence E() such that does contain arbitrary long arithmetic progressions of length N and step =O(N).