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Multiplication complexe et équivalence élémentaire dans le langage des corps
Journal of Symbolic Logic 67 (2):635-648 (2002)
Abstract
Let K and K' be two elliptic fields with complex multiplication over an algebraically closed field k of characteristic 0, non k-isomorphic, and let C and C' be two curves with respectively K and K' as function fields. We prove that if the endomorphism rings of the curves are not isomorphic then K and K' are not elementarily equivalent in the language of fields expanded with a constant symbol (the modular invariant). This theorem is an analogue of a theorem from David A. Pierce in the language of k-algebrasOther Versions
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