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- Maximal_compact_subgroup abstract "In mathematics, a maximal compact subgroup K of a topological group G is a subgroup K that is a compact space, in the subspace topology, and maximal amongst such subgroups.Maximal compact subgroups play an important role in the classification of Lie groups and especially semi-simple Lie groups. Maximal compact subgroups of Lie groups are not in general unique, but are unique up to conjugation – they are essentially unique.".
- Maximal_compact_subgroup wikiPageExternalLink liealgebrasandli029541mbp.
- Maximal_compact_subgroup wikiPageExternalLink fitem?id=SB_1948-1951__1__271_0.
- Maximal_compact_subgroup wikiPageExternalLink fitem?id=SSL_1954-1955__1__A24_0.
- Maximal_compact_subgroup wikiPageID "1496726".
- Maximal_compact_subgroup wikiPageLength "11646".
- Maximal_compact_subgroup wikiPageOutDegree "50".
- Maximal_compact_subgroup wikiPageRevisionID "646848801".
- Maximal_compact_subgroup wikiPageWikiLink Algebraic_topology.
- Maximal_compact_subgroup wikiPageWikiLink Bruhat-Tits_fixed_point_theorem.
- Maximal_compact_subgroup wikiPageWikiLink Cartan_decomposition.
- Maximal_compact_subgroup wikiPageWikiLink Cartan_fixed_point_theorem.
- Maximal_compact_subgroup wikiPageWikiLink Cartan_involution.
- Maximal_compact_subgroup wikiPageWikiLink Category:Lie_groups.
- Maximal_compact_subgroup wikiPageWikiLink Category:Topological_groups.
- Maximal_compact_subgroup wikiPageWikiLink Circle_group.
- Maximal_compact_subgroup wikiPageWikiLink Circumcenter.
- Maximal_compact_subgroup wikiPageWikiLink Circumscribed_circle.
- Maximal_compact_subgroup wikiPageWikiLink Compact_Lie_group.
- Maximal_compact_subgroup wikiPageWikiLink Compact_group.
- Maximal_compact_subgroup wikiPageWikiLink Compact_space.
- Maximal_compact_subgroup wikiPageWikiLink Complete_metric_space.
- Maximal_compact_subgroup wikiPageWikiLink Complex_Lie_group.
- Maximal_compact_subgroup wikiPageWikiLink Complexification_(Lie_group).
- Maximal_compact_subgroup wikiPageWikiLink Conjugacy_class.
- Maximal_compact_subgroup wikiPageWikiLink Contractible.
- Maximal_compact_subgroup wikiPageWikiLink Contractible_space.
- Maximal_compact_subgroup wikiPageWikiLink Convex_function.
- Maximal_compact_subgroup wikiPageWikiLink Curvature.
- Maximal_compact_subgroup wikiPageWikiLink Deformation_retract.
- Maximal_compact_subgroup wikiPageWikiLink Essentially_unique.
- Maximal_compact_subgroup wikiPageWikiLink Fixed-point_subgroup.
- Maximal_compact_subgroup wikiPageWikiLink Fixed_point_subgroup.
- Maximal_compact_subgroup wikiPageWikiLink General_linear_group.
- Maximal_compact_subgroup wikiPageWikiLink Gram-Schmidt_process.
- Maximal_compact_subgroup wikiPageWikiLink Gram–Schmidt_process.
- Maximal_compact_subgroup wikiPageWikiLink Hadamard_space.
- Maximal_compact_subgroup wikiPageWikiLink Homotopy.
- Maximal_compact_subgroup wikiPageWikiLink Homotopy_equivalence.
- Maximal_compact_subgroup wikiPageWikiLink Homotopy_equivalent.
- Maximal_compact_subgroup wikiPageWikiLink Homotopy_group.
- Maximal_compact_subgroup wikiPageWikiLink Homotopy_groups.
- Maximal_compact_subgroup wikiPageWikiLink Hyperspecial_subgroup.
- Maximal_compact_subgroup wikiPageWikiLink Induced_representation.
- Maximal_compact_subgroup wikiPageWikiLink Inner_product.
- Maximal_compact_subgroup wikiPageWikiLink Inner_product_space.
- Maximal_compact_subgroup wikiPageWikiLink Iwasawa_decomposition.
- Maximal_compact_subgroup wikiPageWikiLink Killing_form.
- Maximal_compact_subgroup wikiPageWikiLink Mathematics.
- Maximal_compact_subgroup wikiPageWikiLink Maximal.
- Maximal_compact_subgroup wikiPageWikiLink Maximal_subgroup.
- Maximal_compact_subgroup wikiPageWikiLink Negative_curvature.
- Maximal_compact_subgroup wikiPageWikiLink Orthogonal_group.
- Maximal_compact_subgroup wikiPageWikiLink QR_decomposition.
- Maximal_compact_subgroup wikiPageWikiLink Representation_theory.
- Maximal_compact_subgroup wikiPageWikiLink Restricted_representation.
- Maximal_compact_subgroup wikiPageWikiLink Riemannian_manifold.
- Maximal_compact_subgroup wikiPageWikiLink Riemannian_symmetric_space.
- Maximal_compact_subgroup wikiPageWikiLink SL2(R).
- Maximal_compact_subgroup wikiPageWikiLink Semisimple_Lie_algebra.
- Maximal_compact_subgroup wikiPageWikiLink Semisimple_Lie_group.
- Maximal_compact_subgroup wikiPageWikiLink Spherical_function.
- Maximal_compact_subgroup wikiPageWikiLink Strictly_convex.
- Maximal_compact_subgroup wikiPageWikiLink Subgroup.
- Maximal_compact_subgroup wikiPageWikiLink Subspace_topology.
- Maximal_compact_subgroup wikiPageWikiLink Symmetric_space.
- Maximal_compact_subgroup wikiPageWikiLink Topological_group.
- Maximal_compact_subgroup wikiPageWikiLinkText "Maximal compact subgroup".
- Maximal_compact_subgroup wikiPageWikiLinkText "a general argument".
- Maximal_compact_subgroup wikiPageWikiLinkText "maximal compact subgroup".
- Maximal_compact_subgroup hasPhotoCollection Maximal_compact_subgroup.
- Maximal_compact_subgroup wikiPageUsesTemplate Template:Citation.
- Maximal_compact_subgroup wikiPageUsesTemplate Template:Harvtxt.
- Maximal_compact_subgroup wikiPageUsesTemplate Template:Reflist.
- Maximal_compact_subgroup subject Category:Lie_groups.
- Maximal_compact_subgroup subject Category:Topological_groups.
- Maximal_compact_subgroup hypernym K.
- Maximal_compact_subgroup type School.
- Maximal_compact_subgroup type Space.
- Maximal_compact_subgroup comment "In mathematics, a maximal compact subgroup K of a topological group G is a subgroup K that is a compact space, in the subspace topology, and maximal amongst such subgroups.Maximal compact subgroups play an important role in the classification of Lie groups and especially semi-simple Lie groups. Maximal compact subgroups of Lie groups are not in general unique, but are unique up to conjugation – they are essentially unique.".
- Maximal_compact_subgroup label "Maximal compact subgroup".
- Maximal_compact_subgroup sameAs m.055z22.
- Maximal_compact_subgroup sameAs Q6795635.
- Maximal_compact_subgroup sameAs Q6795635.
- Maximal_compact_subgroup sameAs 极大紧子群.
- Maximal_compact_subgroup wasDerivedFrom Maximal_compact_subgroup?oldid=646848801.
- Maximal_compact_subgroup isPrimaryTopicOf Maximal_compact_subgroup.