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The query [[Fact about.Page::Automorphism group of a group]] was answered by the SMWSQLStore3 in 0.0093 seconds.


Results 1 – 8    (Previous 50 | Next 50)   (20 | 50 | 100 | 250 | 500)   (JSON | CSV | RSS | RDF)
 Difficulty levelFact about
Automorphism group of finite nilpotent group is direct product of automorphism groups of Sylow subgroupsFinite nilpotent group (2)
Sylow subgroup (3)
Automorphism group of a group (3)
Automorphism group of simple non-abelian group need not be ambivalentSimple non-abelian group (?)
Automorphism group of a group (?)
Ambivalent group (?)
Centerless and characteristic in automorphism group implies automorphism group is completeCenterless group (?)
Automorphism group of a group (?)
Characteristic subgroup (?)
Complete group (?)
Centerless and maximal in automorphism group implies every automorphism is normal-extensibleCenterless group that is maximal in its automorphism group (2)
Group in which every automorphism is normal-extensible (2)
Centerless group (?)
Maximal subgroup (?)
Automorphism group of a group (?)
Normal-extensible automorphism (?)
Characteristically simple and non-abelian implies monolith in automorphism groupCharacteristically simple group (?)
Monolith (?)
Automorphism group of a group (?)
Monolithic group (?)
Simple non-abelian group (?)
Cyclic automorphism group implies abelianGroup whose automorphism group is cyclic (?)
Automorphism group of a group (?)
Cyclic group (?)
Abelian group (?)
Extraspecial implies inner automorphism group is self-centralizing in automorphism groupInner automorphism group (?)
Extraspecial group (?)
Self-centralizing subgroup (?)
Automorphism group of a group (?)
Wielandt's automorphism tower theoremCenterless group (?)
Automorphism tower of a centerless group (?)
Automorphism group of a group (?)