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Preprint Number 192
192. Philipp Hieronymi
Defining the integers in expansions of the real field by a closed discrete set
Submission date: 28 June 2009.
Abstract. Let D\subseteq R be closed and discrete and f : D^n \to R be such that f(D^n ) is somewhere dense. We show that (R, +, ·, f ) defines Z. As an application, we get that for every α, β in R with log_α (β) \notin Q, the real field expanded by the two cyclic multiplicative subgroups generated by α and β defines Z.
Mathematics Subject Classification: 03C64
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