Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Ehresmanns_lemma> ?p ?o }
Showing triples 1 to 34 of
34
with 100 triples per page.
- Ehresmanns_lemma abstract "In mathematics, Ehresmann's lemma or Ehresmann's fibration theorem states that a smooth mapping f:M → Nwhere M and N are smooth manifolds, such thatf is a surjective submersion, andf is a proper map, (in particular if M is compact)is a locally trivial fibration. This is a foundational result in differential topology, and exists in many further variants. It is due to Charles Ehresmann.".
- Ehresmanns_lemma wikiPageID "981793".
- Ehresmanns_lemma wikiPageLength "759".
- Ehresmanns_lemma wikiPageOutDegree "11".
- Ehresmanns_lemma wikiPageRevisionID "662497403".
- Ehresmanns_lemma wikiPageWikiLink Category:Theorems_in_differential_topology.
- Ehresmanns_lemma wikiPageWikiLink Charles_Ehresmann.
- Ehresmanns_lemma wikiPageWikiLink Differentiable_manifold.
- Ehresmanns_lemma wikiPageWikiLink Differential_topology.
- Ehresmanns_lemma wikiPageWikiLink Fiber_bundle.
- Ehresmanns_lemma wikiPageWikiLink Fibration.
- Ehresmanns_lemma wikiPageWikiLink Locally_trivial.
- Ehresmanns_lemma wikiPageWikiLink Mathematics.
- Ehresmanns_lemma wikiPageWikiLink Proper_map.
- Ehresmanns_lemma wikiPageWikiLink Smooth_manifold.
- Ehresmanns_lemma wikiPageWikiLink Smooth_mapping.
- Ehresmanns_lemma wikiPageWikiLink Smoothness.
- Ehresmanns_lemma wikiPageWikiLink Submersion_(mathematics).
- Ehresmanns_lemma wikiPageWikiLink Surjective.
- Ehresmanns_lemma wikiPageWikiLink Surjective_function.
- Ehresmanns_lemma wikiPageWikiLinkText "Ehresmann's lemma".
- Ehresmanns_lemma hasPhotoCollection Ehresmanns_lemma.
- Ehresmanns_lemma wikiPageUsesTemplate Template:Mergeto.
- Ehresmanns_lemma subject Category:Theorems_in_differential_topology.
- Ehresmanns_lemma hypernym Manifolds.
- Ehresmanns_lemma comment "In mathematics, Ehresmann's lemma or Ehresmann's fibration theorem states that a smooth mapping f:M → Nwhere M and N are smooth manifolds, such thatf is a surjective submersion, andf is a proper map, (in particular if M is compact)is a locally trivial fibration. This is a foundational result in differential topology, and exists in many further variants. It is due to Charles Ehresmann.".
- Ehresmanns_lemma label "Ehresmann's lemma".
- Ehresmanns_lemma sameAs Satz_von_Ehresmann.
- Ehresmanns_lemma sameAs Théorème_de_Ehresmann.
- Ehresmanns_lemma sameAs m.03wg6y.
- Ehresmanns_lemma sameAs Q867141.
- Ehresmanns_lemma sameAs Q867141.
- Ehresmanns_lemma wasDerivedFrom Ehresmanns_lemmaoldid=662497403.
- Ehresmanns_lemma isPrimaryTopicOf Ehresmanns_lemma.