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The query [[Fact about.Page::Powering-invariant subgroup]] was answered by the SMWSQLStore3 in 0.0081 seconds.


Results 1 – 24    (Previous 50 | Next 50)   (20 | 50 | 100 | 250 | 500)   (JSON | CSV | RSS | RDF)
 UsesFact about
C-closed implies powering-invariantC-closed implies local powering-invariant
Local powering-invariant implies powering-invariant
C-closed subgroup (2)
Powering-invariant subgroup (2)
Characteristic not implies powering-invariant in solvable groupSolvable group (2)
Characteristic subgroup (2)
Powering-invariant subgroup (2)
Characteristic subgroup of abelian group implies powering-invariantAbelian implies universal power map is endomorphismCharacteristic subgroup of abelian group (2)
Powering-invariant subgroup (2)
Divisibility-closed implies powering-invariantDivisibility-closed subgroup (2)
Powering-invariant subgroup (2)
Endomorphism image implies powering-invariantEndomorphism image implies divisibility-closed
Divisibility-closed implies powering-invariant
Endomorphism image (2)
Powering-invariant subgroup (2)
Every normal subgroup satisfies the quotient-to-subgroup powering-invariance implicationQuotient-powering-invariant subgroup (2)
Powering-invariant subgroup (2)
Finite implies powering-invariantFinite subgroup (2)
Powering-invariant subgroup (2)
Finite index implies powering-invariantPoincare's theorem
Normal of finite index implies quotient-powering-invariant
Finite implies powering-invariant
Powering-invariant over quotient-powering-invariant implies powering-invariant
Subgroup of finite index (2)
Powering-invariant subgroup (2)
Minimal normal implies powering-invariant in solvable groupMinimal normal implies additive group of a field in solvable group
Finite implies powering-invariant
Solvable group (?)
Minimal normal subgroup (?)
Powering-invariant subgroup (?)
Minimal normal subgroup of solvable group (2)
Powering-invariant subgroup of solvable group (3)
Powering-invariance does not satisfy intermediate subgroup conditionPowering-invariant subgroup (1)
Intermediate subgroup condition (2)
Powering-invariance does not satisfy lower central series condition in nilpotent groupPowering-invariant subgroup (1)
Lower central series condition (2)
Powering-invariant subgroup (2)
LCS-powering-invariant subgroup (2)
Powering-invariance is centralizer-closedC-closed implies powering-invariantPowering-invariant subgroup (1)
Centralizer-closed subgroup property (2)
Powering-invariance is commutator-closed in nilpotent groupNilpotent group (?)
Powering-invariant subgroup (?)
Commutator-closed subgroup property (?)
Powering-invariance is not commutator-closedPowering-invariant subgroup (1)
Commutator-closed subgroup property (2)
Powering-invariance is not finite-join-closedPowering-invariant subgroup (1)
Finite-join-closed group property (2)
Powering-invariance is not quotient-transitivePowering-invariant subgroup (1)
Quotient-transitive subgroup property (2)
Powering-invariance is strongly intersection-closedPowering-invariant subgroup (1)
Strongly intersection-closed subgroup property (2)
Powering-invariance is strongly join-closed in nilpotent groupDivisible subset generates divisible subgroup in nilpotent groupNilpotent group (?)
Powering-invariant subgroup (?)
Strongly join-closed subgroup property (?)
Powering-invariance is transitivePowering-invariant subgroup (1)
Transitive subgroup property (2)
Powering-invariance is union-closedPowering-invariant subgroup (1)
Union-closed subgroup property (2)
Powering-invariant not implies divisibility-closedPowering-invariant subgroup (2)
Divisibility-closed subgroup (2)
Powering-invariant not implies local powering-invariantPowering-invariant subgroup (2)
Local powering-invariant (2)
Socle is powering-invariant in solvable groupMinimal normal implies powering-invariant in solvable groupSolvable group (3)
Socle (2)
Powering-invariant subgroup (2)
Subgroup of abelian group not implies powering-invariantSubgroup of abelian group (2)
Powering-invariant subgroup (2)