Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Formation_(group_theory)> ?p ?o. }
Showing items 1 to 14 of
14
with 100 items per page.
- Formation_(group_theory) abstract "In mathematical group theory, a formation is a class of groups closed under taking images and such that if G/M and G/N are in the formation then so is G/M∩N. Gaschütz (1962) introduced formations to unify the theory of Hall subgroups and Carter subgroups of finite solvable groups.Some examples of formations are the formation of p-groups for a prime p, the formation of π-groups for a set of primes π, and the formation of nilpotent groups.".
- Formation_(group_theory) wikiPageExternalLink books?id=E7iL1eWB1TkC.
- Formation_(group_theory) wikiPageExternalLink books?id=VoQ53SosWLIC.
- Formation_(group_theory) wikiPageID "33449138".
- Formation_(group_theory) wikiPageRevisionID "558008867".
- Formation_(group_theory) hasPhotoCollection Formation_(group_theory).
- Formation_(group_theory) subject Category:Group_theory.
- Formation_(group_theory) comment "In mathematical group theory, a formation is a class of groups closed under taking images and such that if G/M and G/N are in the formation then so is G/M∩N. Gaschütz (1962) introduced formations to unify the theory of Hall subgroups and Carter subgroups of finite solvable groups.Some examples of formations are the formation of p-groups for a prime p, the formation of π-groups for a set of primes π, and the formation of nilpotent groups.".
- Formation_(group_theory) label "Formation (group theory)".
- Formation_(group_theory) sameAs m.0h94hql.
- Formation_(group_theory) sameAs Q4491882.
- Formation_(group_theory) sameAs Q4491882.
- Formation_(group_theory) wasDerivedFrom Formation_(group_theory)?oldid=558008867.
- Formation_(group_theory) isPrimaryTopicOf Formation_(group_theory).