Semantic search

Jump to: navigation, search
Search

Edit query Show embed code

The query [[Fact about.Page::Quotient-transitive subgroup property]] was answered by the SMWSQLStore3 in 0.0087 seconds.


Results 1 – 21    (Previous 50 | Next 50)   (20 | 50 | 100 | 250 | 500)   (JSON | CSV | RSS | RDF)
 UsesFact about
Central factor is not quotient-transitiveMaximal among abelian normal implies self-centralizing in nilpotentCentral factor (1)
Quotient-transitive subgroup property (2)
Complemented normal is quotient-transitiveComplemented normal subgroup (1)
Quotient-transitive subgroup property (2)
Direct factor is quotient-transitiveDirect factor (1)
Quotient-transitive subgroup property (2)
Endomorphism kernel is quotient-transitiveThird isomorphism theoremEndomorphism kernel (1)
Quotient-transitive subgroup property (2)
Finite direct power-closed characteristic is quotient-transitiveCharacteristicity is quotient-transitiveFinite direct power-closed characteristic subgroup (1)
Quotient-transitive subgroup property (2)
Full invariance is quotient-transitiveFully invariant subgroup (1)
Quotient-transitive subgroup property (2)
Homomorph-containment is quotient-transitiveHomomorph-containing subgroup (1)
Quotient-transitive subgroup property (2)
Intermediate characteristicity is quotient-transitiveCharacteristicity is quotient-transitive
Intermediately operator preserves quotient-transitivity
Intermediately characteristic subgroup (1)
Quotient-transitive subgroup property (2)
Intermediately operator preserves quotient-transitivityQuotient-transitive subgroup property (?)
Isomorph-freeness is quotient-transitiveIsomorph-free subgroup (1)
Quotient-transitive subgroup property (2)
Local powering-invariance is quotient-transitive in nilpotent groupLocal powering-invariant and normal iff quotient-local powering-invariant in nilpotent group
Local powering-invariant over quotient-local powering-invariant implies local powering-invariant
Local powering-invariant subgroup (1)
Quotient-transitive subgroup property (2)
No common composition factor with quotient group is quotient-transitiveNormal subgroup having no common composition factor with its quotient group (1)
Quotient-transitive subgroup property (2)
Powering-invariance is not quotient-transitivePowering-invariant subgroup (1)
Quotient-transitive subgroup property (2)
Pure definability is quotient-transitivePurely definable subgroup (1)
Quotient-transitive subgroup property (2)
Quotient-balanced implies quotient-transitiveQuotient-balanced subgroup property (?)
Quotient-transitive subgroup property (?)
Quotient-local powering-invariance is quotient-transitiveQuotient-local powering-invariant subgroup (1)
Quotient-transitive subgroup property (2)
Quotient-powering-invariance is quotient-transitiveQuotient-powering-invariant subgroup (1)
Quotient-transitive subgroup property (2)
Strict characteristicity is quotient-transitiveStrictly characteristic subgroup (1)
Quotient-transitive subgroup property (2)
Transitive normality is not quotient-transitiveTransitively normal subgroup (1)
Quotient-transitive subgroup property (2)
Verbality is quotient-transitiveVerbal subgroup (1)
Quotient-transitive subgroup property (2)
Weak marginality is quotient-transitiveWeakly marginal subgroup (1)
Quotient-transitive subgroup property (2)