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- Hessian_group abstract "In mathematics, the Hessian group is a finite group of order 216, introduced by Jordan (1877) who named it for Otto Hesse, given by the group of determinant 1 affine transformations of the affine plane over the field of 3 elements. It acts on the Hesse pencil and the Hesse configuration. Its triple cover is a complex reflection group of order 648, and the product of this with a group of order 2 is another complex reflection group. It has a normal subgroup that is an elementary abelian group of order 32, and the quotient by this subgroup is isomorphic to the group SL2(3) of order 24.".
- Hessian_group wikiPageExternalLink syzygeticpencilo00grovrich.
- Hessian_group wikiPageExternalLink 0611590.
- Hessian_group wikiPageExternalLink purl?GDZPPN00215675X.
- Hessian_group wikiPageID "35283230".
- Hessian_group wikiPageLength "2043".
- Hessian_group wikiPageOutDegree "7".
- Hessian_group wikiPageRevisionID "670616977".
- Hessian_group wikiPageWikiLink Category:Finite_groups.
- Hessian_group wikiPageWikiLink Complex_reflection_group.
- Hessian_group wikiPageWikiLink Crelles_Journal.
- Hessian_group wikiPageWikiLink Elementary_abelian_group.
- Hessian_group wikiPageWikiLink Hesse_configuration.
- Hessian_group wikiPageWikiLink Hesse_pencil.
- Hessian_group wikiPageWikiLink Journal_für_die_reine_und_angewandte_Mathematik.
- Hessian_group wikiPageWikiLink Otto_Hesse.
- Hessian_group wikiPageWikiLinkText "Hessian group".
- Hessian_group wikiPageWikiLinkText "Hessian".
- Hessian_group hasPhotoCollection Hessian_group.
- Hessian_group wikiPageUsesTemplate Template:Citation.
- Hessian_group wikiPageUsesTemplate Template:Harvs.
- Hessian_group subject Category:Finite_groups.
- Hessian_group hypernym Group.
- Hessian_group type Band.
- Hessian_group type Group.
- Hessian_group type Group.
- Hessian_group comment "In mathematics, the Hessian group is a finite group of order 216, introduced by Jordan (1877) who named it for Otto Hesse, given by the group of determinant 1 affine transformations of the affine plane over the field of 3 elements. It acts on the Hesse pencil and the Hesse configuration. Its triple cover is a complex reflection group of order 648, and the product of this with a group of order 2 is another complex reflection group.".
- Hessian_group label "Hessian group".
- Hessian_group sameAs m.0j7nb_2.
- Hessian_group sameAs Q5746239.
- Hessian_group sameAs Q5746239.
- Hessian_group wasDerivedFrom Hessian_group?oldid=670616977.
- Hessian_group isPrimaryTopicOf Hessian_group.