Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Mostow–Palais_theorem> ?p ?o }
Showing triples 1 to 33 of
33
with 100 triples per page.
- Mostow–Palais_theorem abstract "In mathematics, the Mostow–Palais theorem is an equivariant version of the Whitney embedding theorem. It states that if a manifold is acted on by a compact Lie group with finitely many orbit types, then it can be embedded into some finite-dimensional orthogonal representation. It was introduced by Mostow (1957) and Palais (1957).".
- Mostow–Palais_theorem wikiPageExternalLink 1970055.
- Mostow–Palais_theorem wikiPageID "34779593".
- Mostow–Palais_theorem wikiPageLength "1236".
- Mostow–Palais_theorem wikiPageOutDegree "9".
- Mostow–Palais_theorem wikiPageRevisionID "685002094".
- Mostow–Palais_theorem wikiPageWikiLink Annals_of_Mathematics.
- Mostow–Palais_theorem wikiPageWikiLink Category:Lie_groups.
- Mostow–Palais_theorem wikiPageWikiLink Category:Theorems_in_topology.
- Mostow–Palais_theorem wikiPageWikiLink Compact_group.
- Mostow–Palais_theorem wikiPageWikiLink Group_action.
- Mostow–Palais_theorem wikiPageWikiLink Indiana_University_Mathematics_Journal.
- Mostow–Palais_theorem wikiPageWikiLink Lie_group.
- Mostow–Palais_theorem wikiPageWikiLink Manifold.
- Mostow–Palais_theorem wikiPageWikiLink Whitney_embedding_theorem.
- Mostow–Palais_theorem wikiPageWikiLinkText "Mostow–Palais theorem".
- Mostow–Palais_theorem wikiPageUsesTemplate Template:Citation.
- Mostow–Palais_theorem wikiPageUsesTemplate Template:Harvs.
- Mostow–Palais_theorem wikiPageUsesTemplate Template:Topology-stub.
- Mostow–Palais_theorem subject Category:Lie_groups.
- Mostow–Palais_theorem subject Category:Theorems_in_topology.
- Mostow–Palais_theorem hypernym Version.
- Mostow–Palais_theorem type Work.
- Mostow–Palais_theorem type Redirect.
- Mostow–Palais_theorem type Theorem.
- Mostow–Palais_theorem comment "In mathematics, the Mostow–Palais theorem is an equivariant version of the Whitney embedding theorem. It states that if a manifold is acted on by a compact Lie group with finitely many orbit types, then it can be embedded into some finite-dimensional orthogonal representation. It was introduced by Mostow (1957) and Palais (1957).".
- Mostow–Palais_theorem label "Mostow–Palais theorem".
- Mostow–Palais_theorem sameAs Q6917002.
- Mostow–Palais_theorem sameAs m.0j3fh7k.
- Mostow–Palais_theorem sameAs Mostow–Palais_sats.
- Mostow–Palais_theorem sameAs Q6917002.
- Mostow–Palais_theorem wasDerivedFrom Mostow–Palais_theorem?oldid=685002094.
- Mostow–Palais_theorem isPrimaryTopicOf Mostow–Palais_theorem.