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- Special_group_(algebraic_group_theory) abstract "In the theory of algebraic groups, a special group is a linear algebraic group G with the property that every principal G-bundle is locally trivial in the Zariski topology. Special groups include the general linear group, the special linear group, and the symplectic group. Special groups are necessarily connected. Products of special groups are special. The projective linear group is not special. There exist Azumaya algebras, which are trivial over a finite separable extension, but not over the base field.".
- Special_group_(algebraic_group_theory) wikiPageID "28142332".
- Special_group_(algebraic_group_theory) wikiPageRevisionID "387046631".
- Special_group_(algebraic_group_theory) hasPhotoCollection Special_group_(algebraic_group_theory).
- Special_group_(algebraic_group_theory) subject Category:Algebraic_groups.
- Special_group_(algebraic_group_theory) type Abstraction100002137.
- Special_group_(algebraic_group_theory) type AlgebraicGroups.
- Special_group_(algebraic_group_theory) type Group100031264.
- Special_group_(algebraic_group_theory) comment "In the theory of algebraic groups, a special group is a linear algebraic group G with the property that every principal G-bundle is locally trivial in the Zariski topology. Special groups include the general linear group, the special linear group, and the symplectic group. Special groups are necessarily connected. Products of special groups are special. The projective linear group is not special.".
- Special_group_(algebraic_group_theory) label "Special group (algebraic group theory)".
- Special_group_(algebraic_group_theory) sameAs m.0cmcgdg.
- Special_group_(algebraic_group_theory) sameAs Q7574821.
- Special_group_(algebraic_group_theory) sameAs Q7574821.
- Special_group_(algebraic_group_theory) sameAs Special_group_(algebraic_group_theory).
- Special_group_(algebraic_group_theory) wasDerivedFrom Special_group_(algebraic_group_theory)?oldid=387046631.
- Special_group_(algebraic_group_theory) isPrimaryTopicOf Special_group_(algebraic_group_theory).