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Stein manifold (Definition)
Definition 1   A complex manifold $ M$ of complex dimension $ n$ is a Stein manifold if it satisfies the following properties
  1. $ M$ is holomorphically convex,
  2. if $ z,w \in M$ and $ z \not= w$ then $ f(z) \not= f(w)$ for some function $ f$ holomorphic on $ M$ (i.e. $ M$ is holomorphically separable),
  3. for every $ z \in M$ there are holomorphic functions $ f_1,\ldots,f_n$ which form a coordinate system at $ z$ (i.e. $ M$ is holomorphically spreadable).

Stein manifold is a generalization of the concept of the domain of holomorphy to manifolds. Furthermore, Stein manifolds are the generalizations of Riemann surfaces in higher dimensions. Every noncompact Riemann surface is a Stein manifold by a theorem of Behnke and Stein. Note that every domain of holomorphy in $ {\mathbb{C}}^n$ is a Stein manifold. It is not hard to see that every closed complex submanifold of a Stein manifold is Stein.

Theorem 1 (Remmert, Narasimhan, Bishop)   If $ M$ is a Stein manifold of dimension $ n$. There exists a proper holomorphic embedding of $ M$ into $ {\mathbb{C}}^{2n+1}$.

Note that no compact complex manifold can be Stein since compact complex manifolds have no holomorphic functions. On the other hand, every compact complex manifold is holomorphically convex.

Bibliography

1
Lars Hörmander. An Introduction to Complex Analysis in Several Variables, North-Holland Publishing Company, New York, New York, 1973.
2
Steven G. Krantz. Function Theory of Several Complex Variables, AMS Chelsea Publishing, Providence, Rhode Island, 1992.



"Stein manifold" is owned by jirka.
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See Also: holomorphically convex, domain of holomorphy

Also defines:  holomorphically separable, holomorphically spreadable
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Cross-references: compact, embedding, complex submanifold, closed, Riemann surfaces, manifolds, domain of holomorphy, coordinate system, holomorphic, function, holomorphically convex, properties, dimension, complex, complex manifold
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This is version 4 of Stein manifold, born on 2005-02-22, modified 2008-03-31.
Object id is 6799, canonical name is SteinManifold.
Accessed 1943 times total.

Classification:
AMS MSC32E10 (Several complex variables and analytic spaces :: Holomorphic convexity :: Stein spaces, Stein manifolds)
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