Chow's Theorem Revisited
| Autor: | Aguilar, Carlos Martínez, Verjovsky, Alberto |
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| Rok vydání: | 2021 |
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| Druh dokumentu: | Working Paper |
| Popis: | We present a proof of Chow's theorem using two results of Errett Bishop retated to volumes and limits of analytic varieties. We think this approach suggested a long time ago in the beautiful book by Gabriel Stolzenberg, is very attractive and easier for students and newcomers to understand, also the theory presented here is linked to areas of mathematics that are not usually associated with Chow's theorem. Furthermore, Bishop's results imply both Chow's and Remmert-Stein's theorems directly, meaning that this approach is more economic and just as profound as Remmert-Stein's proof. At the end of the paper there is a comparison table that explains how Bishop's theorems generalize to several complex variables classical results of one complex variable. Comment: The paper is superceeded by arXiv:2111.04846 math.CV It containes new material and has some minor corrections |
| Databáze: | arXiv |
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