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- Schreier_refinement_theorem abstract "In mathematics, the Schreier refinement theorem of group theory states that any two subnormal series of subgroups of a given group have equivalent refinements, where two series are equivalent if there is a bijection between their factor groups that sends each factor group to an isomorphic one.The theorem is named after the Austrian mathematician Otto Schreier who proved it in 1928. It provides an elegant proof of the Jordan–Hölder theorem. It is often proved using the Zassenhaus lemma.".
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- Schreier_refinement_theorem wikiPageLength "1899".
- Schreier_refinement_theorem wikiPageOutDegree "11".
- Schreier_refinement_theorem wikiPageRevisionID "590661770".
- Schreier_refinement_theorem wikiPageWikiLink Austria.
- Schreier_refinement_theorem wikiPageWikiLink Category:Theorems_in_group_theory.
- Schreier_refinement_theorem wikiPageWikiLink Composition_series.
- Schreier_refinement_theorem wikiPageWikiLink Dihedral_group_of_order_6.
- Schreier_refinement_theorem wikiPageWikiLink Group_theory.
- Schreier_refinement_theorem wikiPageWikiLink Jordan–Hölder_theorem.
- Schreier_refinement_theorem wikiPageWikiLink Mathematician.
- Schreier_refinement_theorem wikiPageWikiLink Mathematics.
- Schreier_refinement_theorem wikiPageWikiLink Otto_Schreier.
- Schreier_refinement_theorem wikiPageWikiLink Subgroup.
- Schreier_refinement_theorem wikiPageWikiLink Subgroup_series.
- Schreier_refinement_theorem wikiPageWikiLink Subnormal_series.
- Schreier_refinement_theorem wikiPageWikiLink Symmetric_group_of_degree_3.
- Schreier_refinement_theorem wikiPageWikiLink Zassenhaus_lemma.
- Schreier_refinement_theorem wikiPageWikiLinkText "Schreier Refinement Theorem".
- Schreier_refinement_theorem wikiPageWikiLinkText "Schreier refinement argument".
- Schreier_refinement_theorem wikiPageWikiLinkText "Schreier refinement theorem".
- Schreier_refinement_theorem wikiPageWikiLinkText "Schreier theorem".
- Schreier_refinement_theorem hasPhotoCollection Schreier_refinement_theorem.
- Schreier_refinement_theorem wikiPageUsesTemplate Template:Abstract-algebra-stub.
- Schreier_refinement_theorem wikiPageUsesTemplate Template:Cite_book.
- Schreier_refinement_theorem subject Category:Theorems_in_group_theory.
- Schreier_refinement_theorem hypernym Equivalent.
- Schreier_refinement_theorem type Organisation.
- Schreier_refinement_theorem type Theorem.
- Schreier_refinement_theorem comment "In mathematics, the Schreier refinement theorem of group theory states that any two subnormal series of subgroups of a given group have equivalent refinements, where two series are equivalent if there is a bijection between their factor groups that sends each factor group to an isomorphic one.The theorem is named after the Austrian mathematician Otto Schreier who proved it in 1928. It provides an elegant proof of the Jordan–Hölder theorem. It is often proved using the Zassenhaus lemma.".
- Schreier_refinement_theorem label "Schreier refinement theorem".
- Schreier_refinement_theorem sameAs Théorème_de_raffinement_de_Schreier.
- Schreier_refinement_theorem sameAs m.03sd5t.
- Schreier_refinement_theorem sameAs Q7432872.
- Schreier_refinement_theorem sameAs Q7432872.
- Schreier_refinement_theorem wasDerivedFrom Schreier_refinement_theorem?oldid=590661770.
- Schreier_refinement_theorem isPrimaryTopicOf Schreier_refinement_theorem.