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The query [[Fact about.Page::Finite group]] was answered by the SMWSQLStore3 in 0.0096 seconds.


Results 1 – 20    (Previous 20 | Next 20)   (20 | 50 | 100 | 250 | 500)   (JSON | CSV | RSS | RDF)
 Difficulty levelFact about
2-Sylow subgroup of rational group is rational if its class is at most twoFinite group (?)
Rational group (?)
Group of nilpotency class two (?)
Abelian direct factor implies potentially verbal in finiteFinite group (?)
Abelian direct factor (?)
Potentially verbal subgroup (?)
Abelian direct factor of finite group (2)
Potentially verbal subgroup of finite group (3)
Central implies finite-pi-potentially verbal in finiteFinite group (?)
Central subgroup (?)
Finite-pi-potentally verbal subgroup (?)
Central subgroup of finite group (2)
Finite-pi-potentally verbal subgroup of finite group (3)
Verbal subgroup (?)
Central implies potentially fully invariant in finiteFinite group (?)
Central subgroup (?)
Potentially fully invariant subgroup (?)
Central subgroup of finite group (2)
Potentially fully invariant subgroup of finite group (3)
Finite-potentially fully invariant subgroup (?)
Finite-potentially fully invariant subgroup (3)
Central implies potentially verbal in finiteCentral subgroup of finite group (2)
Finite-potentially verbal subgroup (2)
Finite group (?)
Central subgroup (?)
Potentially verbal subgroup (?)
Potentially verbal subgroup of finite group (3)
Verbal subgroup (?)
Characteristic not implies isomorph-free in finite groupFinite group (2)
Characteristic subgroup (2)
Isomorph-free subgroup (2)
Characteristic not implies isomorph-normal in finite groupFinite group (2)
Characteristic subgroup (2)
Isomorph-normal subgroup (2)
Characteristic not implies normal-isomorph-freeFinite group (2)
Characteristic subgroup (2)
Normal-isomorph-free subgroup (2)
Characteristic not implies sub-(isomorph-normal characteristic) in finiteFinite group (2)
Characteristic subgroup (2)
Sub-(isomorph-normal characteristic) subgroup (2)
Characteristic not implies sub-isomorph-free in finite groupFinite group (2)
Characteristic subgroup (2)
Sub-isomorph-free subgroup (2)
Conjecture that most finite groups are nilpotentFinite group (?)
Order of a group (?)
Finite nilpotent group (?)
Conjugate-permutable implies subnormal in finiteFinite group (?)
Conjugate-permutable subgroup (?)
Subnormal subgroup (?)
Conjugate-permutable subgroup of finite group (2)
Subnormal subgroup of finite group (3)
Cyclic normal implies finite-pi-potentially verbal in finiteFinite group (?)
Cyclic normal subgroup (?)
Finite-pi-potentially verbal subgroup (?)
Cyclic normal subgroup of finite group (2)
Finite-pi-potentially verbal subgroup of finite group (3)
Cyclic normal implies potentially verbal in finiteFinite group (?)
Cyclic normal subgroup (?)
Potentially verbal subgroup (?)
Cyclic normal subgroup of finite group (2)
Potentially verbal subgroup of finite group (3)
Finite group implies cyclic iff every subgroup is characteristicFinite cyclic group (1)
Finite group (?)
Cyclic group (?)
Characteristic subgroup (?)
Characteristic subgroup of finite group (?)
Fully invariant subgroup (?)
Fully invariant subgroup of finite group (?)
Isomorph-free subgroup (?)
Isomorph-free subgroup of finite group (?)
Verbal subgroup (?)
Verbal subgroup of finite group (?)
Homomorph-containing subgroup (?)
Homomorph-containing subgroup of finite group (?)
Finite groups are 1-isomorphic iff their directed power graphs are isomorphic1-isomorphic finite groups (1)
Finite group (?)
1-isomorphic groups (?)
1-isomorphic finite groups (?)
Directed power graph of a group (?)
Finite implies subnormal join propertyFinite group (2)
Group satisfying subnormal join property (2)
Finite normal implies amalgam-characteristicFinite normal subgroup (2)
Amalgam-characteristic subgroup (2)
Finite group (2)
Always amalgam-characteristic group (2)
Finite not implies composition factor-permutableFinite group (2)
Composition factor-permutable group (2)
Finite not implies composition factor-uniqueFinite group (2)
Composition factor-unique group (2)