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D'Angelo finite type
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(Definition)
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Let $M \subset {\mathbb{C}}^n$ be a real analytic submanifold of real codimension 1. We say $M$ is of finite type in the sense of D'Angelo if there does not exist any germ of a complex analytic subvariety at $p \in M$ , that is contained in $M$ .
The Diederich-Fornaess theorem can be then restated to say that every compact real analytic subvariety of ${\mathbb{C}}^n$ is of D'Angelo finite type at every point.
- 1
- M. Salah Baouendi, Peter Ebenfelt, Linda Preiss Rothschild. Real Submanifolds in Complex Space and Their Mappings, Princeton University Press, Princeton, New Jersey, 1999.
- 2
- D'Angelo, John P. Several complex variables and the geometry of real hypersurfaces, CRC Press, 1993.
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"D'Angelo finite type" is owned by jirka.
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Cross-references: point, finite type, real analytic subvariety, compact, Diederich-Fornaess theorem, contained, complex analytic subvariety, germ, codimension, real, real analytic submanifold
This is version 3 of D'Angelo finite type, born on 2007-12-05, modified 2009-05-01.
Object id is 10102, canonical name is DAngeloFiniteType.
Accessed 610 times total.
Classification:
| AMS MSC: | 32V35 (Several complex variables and analytic spaces :: CR manifolds :: Finite type conditions on CR manifolds) |
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Pending Errata and Addenda
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