The additive groups of Z and Q with predicates for being square-free

Abstract

We consider the four structures (Z; SqfZ), (Z; <, SqfZ), (Q; SqfQ), and (Q; <, SqfQ) where Z is the additive group of integers, SqfZ is the set of a ∈ Z such that vp(a) < 2 for every prime p and corresponding p-adic valuation vp, Q and SqfQ are defined likewise for rational numbers, and < denotes the natural ordering on each of these domains. We prove that the second structure is model-theoretically wild while the other three structures are model-theoretically tame. Moreover, all these results can be seen as examples where number-theoretic randomness yields model-theoretic consequences.