On ovals of Riemann surfaces of even genera (Q1817951)
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scientific article; zbMATH DE number 1383257
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | On ovals of Riemann surfaces of even genera |
scientific article; zbMATH DE number 1383257 |
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On ovals of Riemann surfaces of even genera (English)
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18 July 2000
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Using NEC groups and combinatorial methods, the authors show that three nonconjugate symmetries of a surface of even genus \(g\) have at most \(2g+3\) ovals. Besides this they show that if such a surface admits four nonconjugate symmetries then its total number of ovals does not exceed \(2g+2\). Also they prove that, for every even genus \(g\) and for surfaces with automorphism group \(D_n\times\mathbb{Z}_2\) (each \(n\) dividing \(2g\)), this bound is sharp.
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Riemann surfaces
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Klein surfaces
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NEC groups
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symmetries
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surfaces of even genus
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numbers of ovals
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automorphism groups
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0.91834533
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0.91400826
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0.9123044
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0.89348316
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0.88033843
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0.87942237
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0.8762085
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