强大群体中的Agemos欧米茄。

arXiv: Group Theory Pub Date : 2018-11-02 DOI:10.22108/IJGT.2019.113217.1507

James Williams

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引用次数: 7

摘要

在本文中，我们证明了对于任何强大的$p$ -群$G$，当$p$是奇数素数时，子群$\Omega_{i}(G^{p^{j}})$对所有$i,j\geq1$都是强大的幂零，当$p=2$是奇数素数时，$i\geq1$, $j\geq2$。我们提供一个示例来说明为什么需要在$p=2$中进行此修改。进一步得到了$\Omega_{i}(G^{p^{j}})$的一个强幂零类的界。我们给出了一个例子来证明强大$p$ -群的强大幂零特征子群不一定是强大的。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Omegas of Agemos in Powerful Groups.

In this note we show that for any powerful $p$-group $G$, the subgroup $\Omega_{i}(G^{p^{j}})$ is powerfully nilpotent for all $i,j\geq1$ when $p$ is an odd prime, and $i\geq1$, $j\geq2$ when $p=2$. We provide an example to show why this modification is needed in the case $p=2$. Furthermore we obtain a bound on the powerful nilpotency class of $\Omega_{i}(G^{p^{j}})$. We give an example to show that powerfully nilpotent characteristic subgroups of powerful $p$-groups need not be strongly powerful.

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arXiv: Group Theory

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