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- Carnot_group abstract "In mathematics, a Carnot group is a simply connected nilpotent Lie group, together with a derivation of its Lie algebra such that the subspace with eigenvalue 1 generates the Lie algebra. Carnot groups have a Carnot–Carathéodory metric. They were introduced by Pansu (1982, 1989) and Mitchell (1985).".
- Carnot_group wikiPageExternalLink pansu_These_1982.html.
- Carnot_group wikiPageExternalLink 1214439462.
- Carnot_group wikiPageID "32244169".
- Carnot_group wikiPageLength "1348".
- Carnot_group wikiPageOutDegree "8".
- Carnot_group wikiPageRevisionID "647538580".
- Carnot_group wikiPageWikiLink Annals_of_Mathematics.
- Carnot_group wikiPageWikiLink Category:Lie_groups.
- Carnot_group wikiPageWikiLink Lie_algebra.
- Carnot_group wikiPageWikiLink Lie_group.
- Carnot_group wikiPageWikiLink Mathematics.
- Carnot_group wikiPageWikiLink Pansu_derivative.
- Carnot_group wikiPageWikiLink Simply_connected_space.
- Carnot_group wikiPageWikiLink Sub-Riemannian_manifold.
- Carnot_group wikiPageWikiLinkText "Carnot group".
- Carnot_group wikiPageUsesTemplate Template:Abstract-algebra-stub.
- Carnot_group wikiPageUsesTemplate Template:Citation.
- Carnot_group wikiPageUsesTemplate Template:Harvs.
- Carnot_group wikiPageUsesTemplate Template:Harvtxt.
- Carnot_group subject Category:Lie_groups.
- Carnot_group comment "In mathematics, a Carnot group is a simply connected nilpotent Lie group, together with a derivation of its Lie algebra such that the subspace with eigenvalue 1 generates the Lie algebra. Carnot groups have a Carnot–Carathéodory metric. They were introduced by Pansu (1982, 1989) and Mitchell (1985).".
- Carnot_group label "Carnot group".
- Carnot_group sameAs Q4352257.
- Carnot_group sameAs Groupe_de_Carnot.
- Carnot_group sameAs m.0gxz893.
- Carnot_group sameAs Carnotgrupp.
- Carnot_group sameAs Q4352257.
- Carnot_group wasDerivedFrom Carnot_group?oldid=647538580.
- Carnot_group isPrimaryTopicOf Carnot_group.