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- Higman_group abstract "In mathematics, the Higman group, introduced by Graham Higman (1951), was the first example of an infinite finitely presented group with no non-trivial finite quotients. The quotient by the maximal proper normal subgroup is a finitely generated infinite simple group. Higman (1974) later found some finitely presented infinite groups Gn,r that are simple if n is even and have a simple subgroup of index 2 if n is odd, one of which is one of the Thompson groups.Higman's group is generated by 4 elements a, b, c, d with the relations.".
- Higman_group wikiPageExternalLink books?id=LPvuAAAAMAAJ.
- Higman_group wikiPageID "34581441".
- Higman_group wikiPageRevisionID "580850247".
- Higman_group authorlink "Graham Higman".
- Higman_group first "Graham".
- Higman_group hasPhotoCollection Higman_group.
- Higman_group last "Higman".
- Higman_group year "1951".
- Higman_group subject Category:Group_theory.
- Higman_group comment "In mathematics, the Higman group, introduced by Graham Higman (1951), was the first example of an infinite finitely presented group with no non-trivial finite quotients. The quotient by the maximal proper normal subgroup is a finitely generated infinite simple group.".
- Higman_group label "Higman group".
- Higman_group sameAs m.0j26srf.
- Higman_group sameAs Q5760134.
- Higman_group sameAs Q5760134.
- Higman_group wasDerivedFrom Higman_group?oldid=580850247.
- Higman_group isPrimaryTopicOf Higman_group.