Sur la structure galoisienne relative de puissances de la différente et idéaux de stickelberger
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Publication:5009090
DOI10.1142/S1793042121500536zbMath1482.11151OpenAlexW3116576530MaRDI QIDQ5009090
Publication date: 19 August 2021
Published in: International Journal of Number Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s1793042121500536
rings of integersGalois module structuredifferentmaximal orderStickelberger idealrealizable classesSteinitz classeslocally free classgroupsLagrange resolvent
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- Galois module structure of the square root of the inverse different in even degree tame extensions of number fields
- The Galois structure of the square root of the inverse different
- On the Galois module structure of the square root of the inverse different in abelian extensions
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- On Fröhlich's conjecture for rings of integers of tame extensions
- Integral representations afforded by ambiguous ideals in some abelian extensions
- Galois module structure of elementary abelian extensions
- Realizable Galois module classes over the group ring for non abelian extensions
- Sur l'arithmétique des extensions galoisiennes à groupe de Galois diédral d'ordre \(2p\)
- Classes réalisables d'extensions non abéliennes
- Classes de Steinitz d'extensions non abéliennes de degré p3
- Galois module structure of abelian extensions.
- On realizable Galois module classes by the inverse different
- Structure galoisienne relative de la racine carrée de la codifférente d’extensions métacycliques non abéliennes
- Normal Bases in Galois Extensions of Number Fields
- Steinitz classes of cyclic extensions of prime degree.
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