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- Gorenstein–Walter_theorem abstract "In mathematics, the Gorenstein–Walter theorem, proved by Gorenstein and Walter (1965a, 1965b, 1965c), states that if a finite group G has a dihedral Sylow 2-subgroup, and O(G) is the maximal normal subgroup of odd order, then G/O(G) is isomorphic to a 2-group, or the alternating group A7, or a subgroup of PΓL2(q) containing PSL2(q) for q an odd prime power.".
- Gorenstein–Walter_theorem wikiPageID "29572857".
- Gorenstein–Walter_theorem wikiPageLength "1704".
- Gorenstein–Walter_theorem wikiPageOutDegree "11".
- Gorenstein–Walter_theorem wikiPageRevisionID "646521835".
- Gorenstein–Walter_theorem wikiPageWikiLink Alternating_group.
- Gorenstein–Walter_theorem wikiPageWikiLink Category:Finite_groups.
- Gorenstein–Walter_theorem wikiPageWikiLink Category:Theorems_in_group_theory.
- Gorenstein–Walter_theorem wikiPageWikiLink Dihedral_group.
- Gorenstein–Walter_theorem wikiPageWikiLink Finite_group.
- Gorenstein–Walter_theorem wikiPageWikiLink Journal_of_Algebra.
- Gorenstein–Walter_theorem wikiPageWikiLink Mathematics.
- Gorenstein–Walter_theorem wikiPageWikiLink Normal_subgroup.
- Gorenstein–Walter_theorem wikiPageWikiLink Order_(group_theory).
- Gorenstein–Walter_theorem wikiPageWikiLinkText "Gorenstein–Walter theorem".
- Gorenstein–Walter_theorem last "Gorenstein".
- Gorenstein–Walter_theorem last "Walter".
- Gorenstein–Walter_theorem wikiPageUsesTemplate Template:Abstract-algebra-stub.
- Gorenstein–Walter_theorem wikiPageUsesTemplate Template:Citation.
- Gorenstein–Walter_theorem wikiPageUsesTemplate Template:Harvs.
- Gorenstein–Walter_theorem year "1965".
- Gorenstein–Walter_theorem subject Category:Finite_groups.
- Gorenstein–Walter_theorem subject Category:Theorems_in_group_theory.
- Gorenstein–Walter_theorem hypernym Subgroup.
- Gorenstein–Walter_theorem type EthnicGroup.
- Gorenstein–Walter_theorem type Group.
- Gorenstein–Walter_theorem type Group.
- Gorenstein–Walter_theorem type Redirect.
- Gorenstein–Walter_theorem type Theorem.
- Gorenstein–Walter_theorem comment "In mathematics, the Gorenstein–Walter theorem, proved by Gorenstein and Walter (1965a, 1965b, 1965c), states that if a finite group G has a dihedral Sylow 2-subgroup, and O(G) is the maximal normal subgroup of odd order, then G/O(G) is isomorphic to a 2-group, or the alternating group A7, or a subgroup of PΓL2(q) containing PSL2(q) for q an odd prime power.".
- Gorenstein–Walter_theorem label "Gorenstein–Walter theorem".
- Gorenstein–Walter_theorem sameAs Q5586176.
- Gorenstein–Walter_theorem sameAs Gorensteinin–Walterin_lause.
- Gorenstein–Walter_theorem sameAs m.0ds0kg6.
- Gorenstein–Walter_theorem sameAs Gorenstein–Walters_sats.
- Gorenstein–Walter_theorem sameAs Q5586176.
- Gorenstein–Walter_theorem wasDerivedFrom Gorenstein–Walter_theorem?oldid=646521835.
- Gorenstein–Walter_theorem isPrimaryTopicOf Gorenstein–Walter_theorem.