Generating the Extended Mapping Class Group by Three Involutions
We prove that the extended mapping class group, $\rm Mod^{*}(\Sigma_{g})$, of a connected orientable surface of genus $g$, can be generated by three involutions for $g\geq 5$. In the presence of punctures, we prove that $\rm Mod^{*}(\Sigma_{g,p})$ can be generated by three involutions for $g\geq 10$...
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| Zusammenfassung: | We prove that the extended mapping class group, $\rm Mod^{*}(\Sigma_{g})$, of
a connected orientable surface of genus $g$, can be generated by three
involutions for $g\geq 5$. In the presence of punctures, we prove that $\rm
Mod^{*}(\Sigma_{g,p})$ can be generated by three involutions for $g\geq 10$ and
$p\geq 6$ (with the exception that for $g\geq 11$, $p$ should be at least
$15$). |
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| DOI: | 10.48550/arxiv.2003.10907 |