具有给定可数中心的拟单群的局部化

Ramón Flores, Jos'e L. Rodr'iguez
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引用次数: 1

摘要

群同态$i: H \to G$是$H$的一个局部化,如果对于每个同态$\varphi: H\rightarrow G$存在一个唯一的自同态$\psi: G\rightarrow G$,例如$i \psi=\varphi$(映射作用于右侧)。Göbel和Trlifaj在\cite[Problem 30.4(4), p. 831]{GT12}问哪些阿贝尔群是简单群的定域中心。针对这个问题,我们证明了每一个可数阿贝尔群确实是一个拟简单群的某个定域的中心,即一个简单群的中心扩展。该证明利用了Obraztsov和Ol’shanskii关于具有特殊子群格的无限简单群的构造,并推广了第二作者和Scherer、thsamvenaz和Viruel关于有限简单群的局域化的结果。
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On localizations of quasi-simple groups with given countable center
A group homomorphism $i: H \to G$ is a localization of $H$ if for every homomorphism $\varphi: H\rightarrow G$ there exists a unique endomorphism $\psi: G\rightarrow G$, such that $i \psi=\varphi$ (maps are acting on the right). G\"{o}bel and Trlifaj asked in \cite[Problem 30.4(4), p. 831]{GT12} which abelian groups are centers of localizations of simple groups. Approaching this question we show that every countable abelian group is indeed the center of some localization of a quasi-simple group, i.e. a central extension of a simple group. The proof uses Obraztsov and Ol'shanskii's construction of infinite simple groups with a special subgroup lattice and also extensions of results on localizations of finite simple groups by the second author and Scherer, Th\'{e}venaz and Viruel.
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