在具有强内嵌酉子群的群上

A. Sozutov
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引用次数: 0

摘要

组$G$的适当子组$B$被称为{\it强嵌入}子组,如果$2\in\pi(B)$和$2\notin\pi(B \cap B^g)$对应于任何元素$g \in G \setminus B $,那么$ N_G(X) \leq B$对应于任何2-子组$ X \leq B $。如果对于所有$ g\in G $子群$ \langle a, a^g \rangle $都是{\it有限}的,则群$G$中的元素$a$称为有限的。证明了特征为$2$的局部有限域$Q$上,阶为$4$且强嵌入子群与$U_3(Q)$的Borel子群同构的群是局部有限的,且与群$U_3(Q)$同构。关键词:酉型的强嵌入子群,Borel子群,Cartan,对合,有限元。
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On groups with a strongly embedded unitary subgroup
The proper subgroup $B$ of the group $G$ is called {\it strongly embedded}, if $2\in\pi(B)$ and $2\notin\pi(B \cap B^g)$ for any element $g \in G \setminus B $ and, therefore, $ N_G(X) \leq B$ for any 2-subgroup $ X \leq B $. An element $a$ of a group $G$ is called {\it finite} if for all $ g\in G $ the subgroups $ \langle a, a^g \rangle $ are finite. In the paper, it is proved that the group with finite element of order $4$ and strongly embedded subgroup isomorphic to the Borel subgroup of $U_3(Q)$ over a locally finite field $Q$ of characteristic $2$ is locally finite and isomorphic to the group $U_3(Q)$. Keywords: A strongly embedded subgroup of a unitary type, subgroups of Borel, Cartan, involution, finite element.
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