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- Q6664254 subject Q15206900.
- Q6664254 subject Q7210440.
- Q6664254 subject Q7451460.
- Q6664254 abstract "In Galois cohomology, local Tate duality (or simply local duality) is a duality for Galois modules for the absolute Galois group of a non-archimedean local field. It is named after John Tate who first proved it. It shows that the dual of such a Galois module is the Tate twist of usual linear dual. This new dual is called the (local) Tate dual.Local duality combined with Tate's local Euler characteristic formula provide a versatile set of tools for computing the Galois cohomology of local fields.".
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- Q6664254 wikiPageWikiLink Q15206900.
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- Q6664254 wikiPageWikiLink Q7210440.
- Q6664254 wikiPageWikiLink Q7451460.
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- Q6664254 wikiPageWikiLink Q836088.
- Q6664254 wikiPageWikiLink Q929302.
- Q6664254 comment "In Galois cohomology, local Tate duality (or simply local duality) is a duality for Galois modules for the absolute Galois group of a non-archimedean local field. It is named after John Tate who first proved it. It shows that the dual of such a Galois module is the Tate twist of usual linear dual. This new dual is called the (local) Tate dual.Local duality combined with Tate's local Euler characteristic formula provide a versatile set of tools for computing the Galois cohomology of local fields.".
- Q6664254 label "Local Tate duality".