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The query [[Fact about.Page::Index of a subgroup]] was answered by the SMWSQLStore3 in 0.0074 seconds.


Results 1 – 13    (Previous 50 | Next 50)   (20 | 50 | 100 | 250 | 500)   (JSON | CSV | RSS | RDF)
 Difficulty levelFact about
Degree of irreducible representation divides index of abelian normal subgroup4Degree of a linear representation (1)
Irreducible linear representation (1)
Index of a subgroup (1)
Abelian normal subgroup (1)
Abelian normal subgroup (?)
Degree of a linear representation (?)
Degrees of irreducible representations (?)
Degree of irreducible representation divides index of centerDegree of a linear representation (1)
Irreducible linear representation (1)
Index of a subgroup (1)
Center (1)
Degree of irreducible representation is bounded by index of abelian subgroupDegrees of irreducible representations (?)
Index of a subgroup (?)
Divisibility condition on Sylow numbersNumber (1)
Sylow subgroup (1)
Index of a subgroup (1)
Sylow number (?)
Index is multiplicativeSubgroup of finite index (1)
Transitive subgroup property (2)
Index of a subgroup (1)
Induced class function from conjugacy-closed normal subgroup is index of subgroup times class function inside the subgroup and zero outside the subgroupConjugacy-closed normal subgroup (?)
Class function (?)
Induced class function (?)
Index of a subgroup (?)
Direct factor (?)
Central factor (?)
Minimal normal subgroup with order greater than index is characteristicMinimal normal subgroup (?)
Order of a group (?)
Index of a subgroup (?)
Characteristic subgroup (?)
Minimal normal subgroup with order not dividing index is characteristicMinimal normal subgroup (2)
Order of a group (3)
Index of a subgroup (3)
Characteristic subgroup (3)
Size of conjugacy class divides index of centerSize (1)
Conjugacy class (1)
Center (1)
Index of a subgroup (1)
Size of conjugacy class divides order of inner automorphism groupConjugacy class (?)
Order of a group (?)
Inner automorphism group (?)
Index of a subgroup (?)
Center (?)
Size of conjugacy class of subgroups equals index of normalizerConjugate subgroups (?)
Normalizer of a subgroup (?)
Index of a subgroup (?)
Subgroup of index equal to least prime divisor of group order is normalSubgroup of prime index (?)
Index of a subgroup (?)
Normal subgroup (?)
Finite group (?)
Subgroup of index equal to least prime divisor of group order (?)
Subgroup of index equal to least prime divisor of group order of finite group (2)
Normal subgroup of finite group (3)
Three solvable subgroups of pairwise coprime indexes implies solvableIndex of a subgroup (?)
Finite solvable group (?)