$\lambda$-adic模块的扭曲引理

Pub Date : 2020-08-21 DOI:10.4310/ajm.2021.v25.n4.a5
S. Ghosh, Somnath Jha, Sudhanshu Shekhar
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引用次数: 0

摘要

一个经典的扭转引理说,给定一个有限生成的扭转模 $M$ 在Iwasawa代数上 $\mathbb{Z}_p[[\Gamma ]]$ 有 $\Gamma \cong \mathbb{Z}_p, \ \exists$ 连续字符 $\theta: \Gamma \rightarrow \mathbb{Z}_p^\times$ 这样, $ \Gamma^{n}$-扭转的欧拉特性 $M(\theta)$ 是有限的 $n$. 这个扭曲引理已推广到一般紧的Iwasawa代数 $p$一元李群 $G$. 在这篇文章中,我们考虑了扭引理的进一步推广 $\mathcal{T}[[G]]$ 模块,其中 $G$ 是一个契约 $p$-adic李群和 $\mathcal{T}$ 有限扩展是 $\mathbb{Z}_p[[X]]$. 这样的模块自然出现在Hida理论中。通过考虑a的大Selmer(分别为细Selmer)群的扭曲欧拉特性,说明了算法的应用 $\Lambda$-adic形式除以a $p$-adic Lie扩展。
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Twisting lemma for $\lambda$-adic modules
A classical twisting lemma says that given a finitely generated torsion module $M$ over the Iwasawa algebra $\mathbb{Z}_p[[\Gamma ]]$ with $\Gamma \cong \mathbb{Z}_p, \ \exists$ a continuous character $\theta: \Gamma \rightarrow \mathbb{Z}_p^\times$ such that, the $ \Gamma^{n}$-Euler characteristic of the twist $M(\theta)$ is finite for every $n$. This twisting lemma has been generalized for the Iwasawa algebra of a general compact $p$-adic Lie group $G$. In this article, we consider a further generalization of the twisting lemma to $\mathcal{T}[[G]]$ modules, where $G$ is a compact $p$-adic Lie group and $\mathcal{T}$ is a finite extension of $\mathbb{Z}_p[[X]]$. Such modules naturally occur in Hida theory. We also indicate arithmetic application by considering the twisted Euler Characteristic of the big Selmer (respectively fine Selmer) group of a $\Lambda$-adic form over a $p$-adic Lie extension.
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