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- Complex_Lie_group abstract "In geometry, a complex Lie group is a complex-analytic manifold that is also a group in such a way is holomorphic. Basic examples are , the general linear groups over the complex numbers. A connected compact complex Lie group is precisely a complex torus. Any finite group may be given the structure of a complex Lie group. A complex semisimple Lie group is an algebraic group.".
- Complex_Lie_group wikiPageExternalLink c2611apb.pdf.
- Complex_Lie_group wikiPageExternalLink view?rid=ensmat-001:1993:39::15.
- Complex_Lie_group wikiPageID "2187847".
- Complex_Lie_group wikiPageRevisionID "594045312".
- Complex_Lie_group hasPhotoCollection Complex_Lie_group.
- Complex_Lie_group subject Category:Lie_groups.
- Complex_Lie_group subject Category:Manifolds.
- Complex_Lie_group comment "In geometry, a complex Lie group is a complex-analytic manifold that is also a group in such a way is holomorphic. Basic examples are , the general linear groups over the complex numbers. A connected compact complex Lie group is precisely a complex torus. Any finite group may be given the structure of a complex Lie group. A complex semisimple Lie group is an algebraic group.".
- Complex_Lie_group label "Complex Lie group".
- Complex_Lie_group sameAs m.0qfvq_r.
- Complex_Lie_group sameAs Q5156554.
- Complex_Lie_group sameAs Q5156554.
- Complex_Lie_group wasDerivedFrom Complex_Lie_group?oldid=594045312.
- Complex_Lie_group isPrimaryTopicOf Complex_Lie_group.