Expansions of the Group of Integers by Beatty Sequences
Abstract
We study the model theoretic structure (,+,Pr) where r>1 is an irrational number and the elements of Pr are of the form nr for some n∈\0\. We axiomatize of this structure and prove a quantifier elimination result. As a consequence, we get that definable subsets are not sparse unless they are finite. We also prove that there are no reducts of this structure expanding (,+).
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