Proper holomorphic maps from domains in \(\mathbb C^{2}\) with transverse circle action (Q926532)
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scientific article; zbMATH DE number 5277408
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Proper holomorphic maps from domains in \(\mathbb C^{2}\) with transverse circle action |
scientific article; zbMATH DE number 5277408 |
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Proper holomorphic maps from domains in \(\mathbb C^{2}\) with transverse circle action (English)
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20 May 2008
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Let \(T=S^1\) denote the torus and let \(\Omega\) be a bounded connected open subset of \(\mathbb C^2\), which is pseudoconvex, of finite type and with smooth three dimensional boundary. In this paper the authors consider proper holomorphic mappings between pseudoconvex regions of \(\mathbb C^2\) and they study transverse actions in relation with the branch locus. Recall that classes of domains admitting a \(T\)-action are for instance Hartogs domains, Reinhardt and quasi-circular domains.
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proper holomorphic map
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pseudoconvex domain
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T-actions
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finite type domains
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0.93055266
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0.9261678
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0.92537427
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0.92511755
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0.91931415
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0.9179771
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0.91421294
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