On the density of sumsets, II

Abstract

Arithmetic quasi-densities are a large family of real-valued set functions partially defined on the power set of N, including the asymptotic density, the Banach density, the analytic density, etc. Let B ⊂eq N be a non-empty set covering o(n!) residue classes modulo n! as n ∞ (e.g., the primes or the perfect powers). We show that, for each α ∈ [0,1], there is a set A⊂eq N such that, for every arithmetic quasi-density μ, both A and the sumset A+B are in the domain of μ and, in addition, μ(A + B) = α. The proof relies on the properties of a little known density first considered by Buck in 1946.

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