基于伽罗瓦下降的循环p群和广义四元数群的内平凡模

arXiv: Algebraic Topology Pub Date : 2021-05-07 DOI:10.26153/TSW/13645

J. V. D. Meer, R. Wong

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引用次数: 1

摘要

本文研究了一类$p$-群的内平凡模群。这样的群已经被Carlson-Thevenaz用支持变量理论计算过了;然而，我们在Mathew和Stojanoska的结果的基础上，利用伽罗瓦下降和Picard谱序列，为循环$p$-群、8阶四元数群和广义四元数群提供了新的同调证明。我们的计算为Carlson-Thevenaz的经典作品提供了概念性的见解。

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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Endo-trivial modules for cyclic p-groups and generalized quaternion groups via Galois descent

In this paper, we investigate the group of endotrivial modules for certain $p$-groups. Such groups were already been computed by Carlson-Thevenaz using the theory of support varieties; however, we provide novel homotopical proofs of their results for cyclic $p$-groups, the quaternion group of order 8, and for generalized quaternion groups using Galois descent and Picard spectral sequences, building on results of Mathew and Stojanoska. Our computations provide conceptual insights into the classical work of Carlson-Thevenaz.

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arXiv: Algebraic Topology

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