Real Algebraic and Analytic Geometry

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250. Y. Peterzil, S. Starchenko:
Mild Manifolds and a Non-Standard Riemann Existence Theorem.

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Submission: 2008, January 29.

Let R be an o-minimal expansion of a real closed field whose algebraic closure (in the sense of fields) is K. In earlier papers we investigated the notions of R-definable K-holomorphic maps, K-analytic manifolds and their K-analytic subsets. We call such a K-manifold mild if it eliminates quantifiers after endowing it with all K-analytic subsets. Examples are compact complex manifolds and non-singular algebraic curves over K. We examine here basic properties of mild manifolds and prove that when a mild manifold M is strongly minimal and not locally modular then M is bi-holomorphic with a non-singular algebraic curve over K.

Mathematics Subject Classification (2000): 03C64, 03H05, 32P05, 03C98, 30F99, 32C25.

Keywords and Phrases: O-minimality, Non-Archimedean complex analysis, Zariski geometries, Riemann existence theorem.

Full text, 24p.: pdf 996k.

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