Additive complements for two given asymptotic densities

Abstract

Let 0 α β 1. For any finite set B⊂N, we show that there exists a set A⊂N such that d(A+B) = α and d(A+B) = β, where d(A+ B) and d(A+B) are the lower and upper asymptotic densities of the set A+B, respectively. This partially answers a question by Faisant et al. A theorem involving the so-called highly sparse sets was proved in the previous arXiv version of this note; however, as pointed out by Sai Teja Somu, the proof of the theorem was flawed. The theorem is now an open question.

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