A Stein manifold topologically but not holomorphically equivalent to a domain in \({\mathbb{C}}^ n\)
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Publication:1073976
DOI10.1016/S0001-8708(86)80009-3zbMath0589.32026MaRDI QIDQ1073976
William R. Zame, Edgar Lee Stout
Publication date: 1986
Published in: Advances in Mathematics (Search for Journal in Brave)
Holomorphic mappings and correspondences (32H99) Real submanifolds in complex manifolds (32V40) Stein spaces (32E10) Generalizations of analytic spaces (32K99)
Related Items (9)
On a family of real hypersurfaces in a complex quadric ⋮ On homogeneous hypersurfaces in \(\mathbb C^3\) ⋮ Existence results of totally real immersions and embeddings into ℂ^{ℕ} ⋮ Totally real immersions of surfaces ⋮ On the automorphism group of a Stein manifold ⋮ ON THE CLASSIFICATION BY MORIMOTO AND NAGANO ⋮ ON THE CLASSIFICATION OF HOMOGENEOUS HYPERSURFACES IN COMPLEX SPACE ⋮ Totally real imbeddings and the universal covering spaces of domains of holomorphy: Some examples ⋮ Some totally real embeddings of three-manifolds
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- The classification of immersions of spheres in Euclidean spaces
- The stable homotopy of the classical groups
- Compact real submanifolds of a complex manifold with nondegenerate holomorphic tangent bundles
- Sur le fibré normal à une variété plongée dans l'espace euclidien
- Topology of Lie groups and characteristic classes
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