Definable groups in models of Presburger Arithmetic and G^{00}

Alf Onshuus; Mariana Vicar\'ia

arxiv: 1612.09042 · v3 · pith:Z4NQPNVLnew · submitted 2016-12-29 · 🧮 math.LO

Definable groups in models of Presburger Arithmetic and G⁰⁰

Alf Onshuus , Mariana Vicar\'ia This is my paper

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keywords arithmeticdefinablepresburgereverygroupgroupsmodeltheorem

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This paper is devoted to understand groups definable in Presburger arithmetic. We prove the following theorems: Theorem 1. Every group definable in a model of Presburger Arithmetic is abelian-by-finite. Theorem 2. Every bounded group definable in a model (Z,+,<) of Presburger Arithmetic is definably isomorphic to (Z, +)^{n} mod out by a lattice.

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Definable groups in models of Presburger Arithmetic and G⁰⁰

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