DBpedia 2014 |

DBpedia 2014

Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Special_group_(finite_group_theory)> ?p ?o. }

Showing items 1 to 18 of 18 with 100 items per page.

Special_group_(finite_group_theory) abstract "In group theory, a discipline within abstract algebra, a special group is a finite group of prime power order that is either elementary abelian itself or of class 2 with its derived group, its center, and its Frattini subgroup all equal and elementary abelian (Gorenstein 1980, p.183). A special group of order pn that has class 2 and whose derived group has order p is called an extra special group.".
Special_group_(finite_group_theory) wikiPageExternalLink item=CHEL-301-H.
Special_group_(finite_group_theory) wikiPageID "28953957".
Special_group_(finite_group_theory) wikiPageRevisionID "525873185".
Special_group_(finite_group_theory) hasPhotoCollection Special_group_(finite_group_theory).
Special_group_(finite_group_theory) subject Category:Finite_groups.
Special_group_(finite_group_theory) subject Category:P-groups.
Special_group_(finite_group_theory) type Abstraction100002137.
Special_group_(finite_group_theory) type FiniteGroups.
Special_group_(finite_group_theory) type Group100031264.
Special_group_(finite_group_theory) comment "In group theory, a discipline within abstract algebra, a special group is a finite group of prime power order that is either elementary abelian itself or of class 2 with its derived group, its center, and its Frattini subgroup all equal and elementary abelian (Gorenstein 1980, p.183). A special group of order pn that has class 2 and whose derived group has order p is called an extra special group.".
Special_group_(finite_group_theory) label "Special group (finite group theory)".
Special_group_(finite_group_theory) sameAs m.0dgrd6c.
Special_group_(finite_group_theory) sameAs Q7574823.
Special_group_(finite_group_theory) sameAs Q7574823.
Special_group_(finite_group_theory) sameAs Special_group_(finite_group_theory).
Special_group_(finite_group_theory) wasDerivedFrom Special_group_(finite_group_theory)?oldid=525873185.
Special_group_(finite_group_theory) isPrimaryTopicOf Special_group_(finite_group_theory).