Analytic varieties versus integral varieties of Lie algebras of vector fields
classification
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keywords
algebraanalytictangentfieldsvarietyvectoralgebrasgerm
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We associate to any germ of an analytic variety a Lie algebra of tangent vector fields, the {\it tangent algebra}. Conversely, to any Lie algebra of vector fields an analytic germ can be associated, the {\it integral variety}. The paper investigates properties of this correspondence: The set of all tangent algebras is characterized in purely Lie algebra theoretic terms. And it is shown that the tangent algebra determines the analytic type of the variety.
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