Topological normal generation of big mapping class groups
| Autor: | Baik, Juhun |
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| Rok vydání: | 2024 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | A topological group $G$ is topologically normally generated if there is $g \in G$ such that the normal closure of $g$ is dense in $G$. Suppose $S$ is a tame, infinite type surface whose $\mathrm{Map}(S)$ is CB generated. We prove that if the end space of $S$ is countable, then $\mathrm{Map}(S)$ is topologically normally generated if and only if $S$ is uniquely self-similar. Moreover, if the end space of $S$ is uncountable, we give a sufficient condition for $S$ that $\mathrm{Map}(S)$ is topologically normally generated. As a result, we provide uncountably many examples, each of which is not telescoping and $\mathrm{Map}(S)$ is topologically normally generated. We also proved the semidirect product structure of $\mathrm{FMap}(S)$, which is a subgroup of $\mathrm{Map}(S)$ that fixes all isolated maximal ends pointwise. Finally we show that the minimum number of normal generators of $\mathrm{Map}(S)$ is bounded both below and above by constants, which both depending only on the topology of $S$. The upper bound grows quadratically with respect to the constant. Comment: 24 pages, 9 figures, Comments are welcome! |
| Databáze: | arXiv |
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