\(n\)-concavity of \(n\)-dimensional complex spaces (Q811499)
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scientific article; zbMATH DE number 4215920
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | \(n\)-concavity of \(n\)-dimensional complex spaces |
scientific article; zbMATH DE number 4215920 |
Statements
\(n\)-concavity of \(n\)-dimensional complex spaces (English)
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1992
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It is shown that any irreducible \(n\)-dimensional complex space is strongly \(n\)-concave. The proof is based on a theorem of Diederich and Fornaess about the approximation of \(q\)-convex functions with corners and on some results of Fornaess and Stout on the coverings of complex manifolds with finitely many polydiscs.
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irreducible n-dimensional complex space
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n-concavity
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0.9285909
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0.90837353
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0.90467197
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0.8981659
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