论在 $p$-adic étale 塔特捻中有值的恒等正则局部环的 étale 超同调

IF 0.8 4区数学 Q2 MATHEMATICS Homology Homotopy and Applications Pub Date : 2024-09-18 DOI:10.4310/hha.2024.v26.n2.a2

Makoto Sakagaito

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引用次数: 0

摘要

假设 $R$ 是混合特征 $(0, p)$的离散估值环谱上的半稳态族的局部环的埘，而 $k$ 是 $R$ 的残差域。在本文中，我们证明了 étale 超同调群 $H^{n+1}_{textrm{ét}} 的同构性。(R, \mathfrak{T}_r (n))\simeq H^{1}_{textrm{ét}}(k, W_r \Omega^n_{\log})$ 对于任意整数 $n \geqslant 0$ 和 $r \gt 0$，其中 $\mathfrak{T}_r (n)$ 是 p-adic Tate 扭转，$W_r \Omega^n_\{log}$ 是对数霍奇-维特剪切。作为应用，我们证明了混合特征的优秀亨氏离散估值环上曲线函数场的伽罗瓦同调群的局部-全局原理。

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On étale hypercohomology of henselian regular local rings with values in $p$-adic étale Tate twists

Let $R$ be the henselization of a local ring of a semistable family over the spectrum of a discrete valuation ring of mixed characteristic $(0, p)$ and $k$ the residue field of $R$. In this paper, we prove an isomorphism of étale hypercohomology groups $H^{n+1}_{\textrm{ét}} (R, \mathfrak{T}_r (n)) \simeq H^{1}_{\textrm{ét}} (k, W_r \Omega^n_{\log})$ for any integers $n \geqslant 0$ and $r \gt 0$ where $\mathfrak{T}_r (n)$ is the p-adic Tate twist and $W_r \Omega^n_{\log}$ is the logarithmic Hodge–Witt sheaf. As an application, we prove the local-global principle for Galois cohomology groups over function fields of curves over an excellent henselian discrete valuation ring of mixed characteristic.

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来源期刊

Homology Homotopy and Applications 数学-数学

CiteScore

1.10

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： Homology, Homotopy and Applications is a refereed journal which publishes high-quality papers in the general area of homotopy theory and algebraic topology, as well as applications of the ideas and results in this area. This means applications in the broadest possible sense, i.e. applications to other parts of mathematics such as number theory and algebraic geometry, as well as to areas outside of mathematics, such as computer science, physics, and statistics. Homotopy theory is also intended to be interpreted broadly, including algebraic K-theory, model categories, homotopy theory of varieties, etc. We particularly encourage innovative papers which point the way toward new applications of the subject.

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