永磁单能组

Pub Date : 2024-02-23 DOI:10.1007/s00031-024-09846-3

Zev Rosengarten

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引用次数: 0

摘要

我们介绍了永绕单能群，并证明它们同时满足某些 "无处不在 "和 "刚性 "的特性，这些特性的结合使它们在研究一般永绕单能群时非常有用。为了说明它们的作用，我们介绍了两个应用：我们证明了在 \(\textbf{F}_p\) 上有限生成的（无限）域上的非分裂光滑单能群具有无限的第一同调；我们还证明了在不完善度为 1 的域上的每个交换 p-torsion 周期单能群都是交换伪还原群的最大单能商，从而部分地回答了托塔罗的一个问题。

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Permawound Unipotent Groups

We introduce the class of permawound unipotent groups, and show that they simultaneously satisfy certain “ubiquity” and “rigidity” properties that in combination render them very useful in the study of general wound unipotent groups. As an illustration of their utility, we present two applications: We prove that nonsplit smooth unipotent groups over (infinite) fields finitely generated over \(\textbf{F}_p\) have infinite first cohomology; and we show that every commutative p-torsion wound unipotent group over a field of degree of imperfection 1 is the maximal unipotent quotient of a commutative pseudo-reductive group, thus partially answering a question of Totaro.

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