A proof of Cauchy's theorem (Q2565349): Difference between revisions
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Revision as of 05:40, 5 April 2025
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| Language | Label | Description | Also known as |
|---|---|---|---|
| English | A proof of Cauchy's theorem |
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A proof of Cauchy's theorem (English)
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2 November 1997
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Using a standard subdivision argument, the authors prove the following homology version of Cauchy's theorem: if \(G\) is an open subset of the complex plane, \(f\) is an analytic function on \(G\) and \(\beta\) is a 1-chain on \(G\) which is the boundary of a 2-chain so that each summand of \(\partial\beta\) is rectifiable then \(\int_\beta f=0\).
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Cauchy's theorem
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