On the density or measure of sets and their sumsets in the integers or the circle

Abstract

Let d(A) be the asymptotic density (if it exists) of a sequence of integers A. For any real numbers 0≤α≤β≤ 1, we solve the question of the existence of a sequence A of positive integers such that d(A)=α and d(A+A)=β. More generally we study the set of k-tuples (d(iA))1≤ i≤ k for A⊂ N. This leads us to introduce subsets defined by diophantine constraints inside a random set of integers known as the set of ``pseudo sth powers''. We consider similar problems for subsets of the circle R/Z, that is, we partially determine the set of k-tuples (μ(iA))1≤ i≤ k for A⊂ R/Z.