Semantic search

Jump to: navigation, search
Search

Edit query Show embed code

The query [[Fact about.Page::Subgroup-closed group property]] was answered by the SMWSQLStore3 in 0.0083 seconds.


Results 1 – 18    (Previous 50 | Next 50)   (20 | 50 | 100 | 250 | 500)   (JSON | CSV | RSS | RDF)
 UsesFact about
Abelianness is subgroup-closedAbelian group (1)
Subgroup-closed group property (2)
Baer Lie property is not subgroup-closedBaer Lie group (1)
Subgroup-closed group property (2)
Cyclicity is subgroup-closedCyclic group (1)
Subgroup-closed group property (2)
Finitely generated abelian is subgroup-closedFinitely generated abelian group (1)
Subgroup-closed group property (2)
Finitely generated abelian group (2)
Noetherian group (2)
Finitely generated group (?)
Finitely generated not implies NoetherianFinitely generated group (2)
Noetherian group (2)
Finitely generated group (1)
Subgroup-closed group property (2)
Free abelian is subgroup-closedFree abelian group (1)
Subgroup-closed group property (2)
Freeness is subgroup-closedFree group (1)
Subgroup-closed group property (2)
Having subgroups of all orders dividing the group order is not subgroup-closedFinite solvable not implies subgroups of all orders dividing the group order
Every finite solvable group is a subgroup of a finite group having subgroups of all orders dividing the group order
Group having subgroups of all orders dividing the group order (1)
Subgroup-closed group property (2)
Hopfianness is not subgroup-closedHopfian group (1)
Subgroup-closed group property (2)
Lazard Lie property is not subgroup-closedLazard Lie group (1)
Subgroup-closed group property (2)
Nilpotency of fixed class is subgroup-closedNilpotent group (1)
Subgroup-closed group property (2)
Nilpotency class (1)
Noetherianness is subgroup-closedNoetherian group (1)
Subgroup-closed group property (2)
P-constraint is not subgroup-closedConstrained for a prime divisor implies not simple non-abelianP-constrained group (1)
Subgroup-closed group property (2)
Perfectness is not subgroup-closedPerfect group (1)
Subgroup-closed group property (2)
Residual finiteness is subgroup-closedFiniteness is subgroup-closed
Residually operator preserves subgroup-closedness
Normality satisfies transfer condition
Index satisfies transfer inequality
Residually finite group (1)
Subgroup-closed group property (2)
Residually operator preserves subgroup-closednessSecond isomorphism theorem
Normality satisfies transfer condition
Subgroup-closed group property (?)
Residually operator (?)
Schur-triviality is not subgroup-closedSchur-trivial group (1)
Subgroup-closed group property (2)
Solvability is subgroup-closedSolvable group (1)
Subgroup-closed group property (2)
Derived length (2)