Tate Duality in Positive Dimension over Function Fields

Zev Rosengarten

doi:10.1090/memo/1444

Tate Duality in Positive Dimension over Function Fields

Zev Rosengarten

Einstein Institute of Mathematics

The Hebrew University of Jerusalem

Research output: Contribution to journal › Article › peer-review

Abstract

We extend the classical duality results of Poitou and Tate for finite discrete Galois modules over local and global fields (local duality, nine-term exact sequence, etc.) to all affine commutative group schemes of finite type, building on the recent work of Česnavičius ("Poitou-Tate without restrictions on the order,"2015) extending these results to all finite commutative group schemes. We concentrate mainly on the more difficult function field setting, giving some remarks about the number field case along the way.

Original language	English
Pages (from-to)	1-217
Number of pages	217
Journal	Memoirs of the American Mathematical Society
Volume	290
Issue number	1444
DOIs	https://doi.org/10.1090/memo/1444
State	Published - Oct 2023

All Science Journal Classification (ASJC) codes

General Mathematics
Applied Mathematics

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10.1090/memo/1444

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title = "Tate Duality in Positive Dimension over Function Fields",

abstract = "We extend the classical duality results of Poitou and Tate for finite discrete Galois modules over local and global fields (local duality, nine-term exact sequence, etc.) to all affine commutative group schemes of finite type, building on the recent work of {\v C}esnavi{\v c}ius ({"}Poitou-Tate without restrictions on the order,{"}2015) extending these results to all finite commutative group schemes. We concentrate mainly on the more difficult function field setting, giving some remarks about the number field case along the way.",

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Tate Duality in Positive Dimension over Function Fields

Abstract

All Science Journal Classification (ASJC) codes

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