Small sets in Mann pairs
Abstract
Let M= M, G be an expansion of a real closed field M by a dense subgroup G of M>0, · with the Mann property. We prove that the induced structure on G by M eliminates imaginaries. As a consequence, every small set X definable in M can be definably embedded into some Gl, uniformly in parameters. These results are proved in a more general setting, where M= M, P is an expansion of an o-minimal structure M by a dense set P⊂eq M, satisfying three tameness conditions.
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