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- Hilbert–Speiser_theorem wikiPageExternalLink books?id=_Q2h83Bm94cC.
- Hilbert–Speiser_theorem wikiPageExternalLink jnth.1999.2425.
- Hilbert–Speiser_theorem wikiPageExternalLink purl?GDZPPN002115344.
- Hilbert–Speiser_theorem wikiPageID "1067670".
- Hilbert–Speiser_theorem wikiPageLength "3487".
- Hilbert–Speiser_theorem wikiPageOutDegree "23".
- Hilbert–Speiser_theorem wikiPageRevisionID "626892933".
- Hilbert–Speiser_theorem wikiPageWikiLink Abelian_extension.
- Hilbert–Speiser_theorem wikiPageWikiLink Algebraic_number_field.
- Hilbert–Speiser_theorem wikiPageWikiLink Category:Cyclotomic_fields.
- Hilbert–Speiser_theorem wikiPageWikiLink Category:Theorems_in_algebraic_number_theory.
- Hilbert–Speiser_theorem wikiPageWikiLink Cyclotomic_field.
- Hilbert–Speiser_theorem wikiPageWikiLink Field_extension.
- Hilbert–Speiser_theorem wikiPageWikiLink Field_trace.
- Hilbert–Speiser_theorem wikiPageWikiLink Galois_module.
- Hilbert–Speiser_theorem wikiPageWikiLink Gaussian_period.
- Hilbert–Speiser_theorem wikiPageWikiLink Kronecker–Weber_theorem.
- Hilbert–Speiser_theorem wikiPageWikiLink Mathematics.
- Hilbert–Speiser_theorem wikiPageWikiLink Mathematische_Annalen.
- Hilbert–Speiser_theorem wikiPageWikiLink Parity_(mathematics).
- Hilbert–Speiser_theorem wikiPageWikiLink Ramification_(mathematics).
- Hilbert–Speiser_theorem wikiPageWikiLink Rational_number.
- Hilbert–Speiser_theorem wikiPageWikiLink Root_of_unity.
- Hilbert–Speiser_theorem wikiPageWikiLink Springer_Science+Business_Media.
- Hilbert–Speiser_theorem wikiPageWikiLink Square-free_integer.
- Hilbert–Speiser_theorem wikiPageWikiLink Tensor_product_of_fields.
- Hilbert–Speiser_theorem wikiPageWikiLink Zahlbericht.
- Hilbert–Speiser_theorem wikiPageWikiLinkText "Hilbert–Speiser theorem".
- Hilbert–Speiser_theorem authorlink "Andreas Speiser".
- Hilbert–Speiser_theorem authorlink "David Hilbert".
- Hilbert–Speiser_theorem first "Anupam".
- Hilbert–Speiser_theorem first "Cornelius".
- Hilbert–Speiser_theorem first "Daniel R.".
- Hilbert–Speiser_theorem first "Karl".
- Hilbert–Speiser_theorem last "Greither".
- Hilbert–Speiser_theorem last "Hilbert".
- Hilbert–Speiser_theorem last "Replogle".
- Hilbert–Speiser_theorem last "Rubin".
- Hilbert–Speiser_theorem last "Speiser".
- Hilbert–Speiser_theorem last "Srivastav".
- Hilbert–Speiser_theorem loc "Satz 132".
- Hilbert–Speiser_theorem loc "corollary to proposition 8.1".
- Hilbert–Speiser_theorem loc "theorem 132".
- Hilbert–Speiser_theorem wikiPageUsesTemplate Template:=.
- Hilbert–Speiser_theorem wikiPageUsesTemplate Template:Citation.
- Hilbert–Speiser_theorem wikiPageUsesTemplate Template:Harvs.
- Hilbert–Speiser_theorem wikiPageUsesTemplate Template:Math.
- Hilbert–Speiser_theorem wikiPageUsesTemplate Template:Mvar.
- Hilbert–Speiser_theorem year "1897".
- Hilbert–Speiser_theorem year "1916".
- Hilbert–Speiser_theorem year "1998".
- Hilbert–Speiser_theorem year "1999".
- Hilbert–Speiser_theorem subject Category:Cyclotomic_fields.
- Hilbert–Speiser_theorem subject Category:Theorems_in_algebraic_number_theory.
- Hilbert–Speiser_theorem hypernym Result.
- Hilbert–Speiser_theorem type Field.
- Hilbert–Speiser_theorem type Redirect.
- Hilbert–Speiser_theorem comment "In mathematics, the Hilbert–Speiser theorem is a result on cyclotomic fields, characterising those with a normal integral basis. More generally, it applies to any finite abelian extension of Q, which by the Kronecker–Weber theorem are isomorphic to subfields of cyclotomic fields.Hilbert–Speiser Theorem. A finite abelian extension K/Q has a normal integral basis if and only if it is tamely ramified over Q.".
- Hilbert–Speiser_theorem label "Hilbert–Speiser theorem".
- Hilbert–Speiser_theorem sameAs Q3527093.
- Hilbert–Speiser_theorem sameAs Théorème_de_Hilbert-Speiser.
- Hilbert–Speiser_theorem sameAs m.0433hf.
- Hilbert–Speiser_theorem sameAs Q3527093.
- Hilbert–Speiser_theorem wasDerivedFrom Hilbert–Speiser_theorem?oldid=626892933.
- Hilbert–Speiser_theorem isPrimaryTopicOf Hilbert–Speiser_theorem.