朗内的$T$矢量和无穷群的模-$p$同调

Marco Boggi
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引用次数: 0

摘要

兰尼斯-奎伦(Lannes-Quillen)定理将有限群$G$的模-$p$同调与$G$的无性基本$p$子群的中心集的模-$p$同调联系起来,其中$p>0$为素数。这一定理被扩展到模为$p$同调代数由亨氏有限生成的无穷群。随后,西蒙兹以较弱的形式将兰尼斯-奎伦定理推广到了任意无穷群。在西蒙兹结果的基础上,我们提出并证明了这一定理在所有无限群中的完整版本。为此,我们为离散扭转模块族建立了一个以无穷空间为参数的乘积理论,它与哈兰、梅尔尼科夫和里贝斯为以无穷空间为参数的无穷模块族建立的共乘积理论在精确意义上是对偶的。在最后一节,我们给出了 p$扭转元素和有限 p$子群的共轭可分性问题的应用。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Lannes' $T$-functor and mod-$p$ cohomology of profinite groups
The Lannes-Quillen theorem relates the mod-$p$ cohomology of a finite group $G$ with the mod-$p$ cohomology of centralizers of abelian elementary $p$-subgroups of $G$, for $p>0$ a prime number. This theorem was extended to profinite groups whose mod-$p$ cohomology algebra is finitely generated by Henn. In a weaker form, the Lannes-Quillen theorem was then extended by Symonds to arbitrary profinite groups. Building on Symonds' result, we formulate and prove a full version of this theorem for all profinite groups. For this purpose, we develop a theory of products for families of discrete torsion modules, parameterized by a profinite space, which is dual, in a very precise sense, to the theory of coproducts for families of profinite modules, parameterized by a profinite space, developed by Haran, Melnikov and Ribes. In the last section, we give applications to the problem of conjugacy separability of $p$-torsion elements and finite $p$-subgroups.
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