Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Transverse_knot> ?p ?o }
Showing triples 1 to 31 of
31
with 100 triples per page.
- Transverse_knot abstract "In mathematics, a transverse knot is a smooth embedding of a circle into a three-dimensional contact manifold such that the tangent vector at every point of the knot is transverse to the contact plane at that point.Any Legendrian knot can be C0-perturbed in a direction transverse to the contact planes to obtain a transverse knot. This yields a bijection between the set of isomorphism classes of transverse knots and the set of isomorphism classes of Legendrian knots modulo negative Legendrian stabilization.".
- Transverse_knot wikiPageExternalLink v=onepage&q=%22Legendrian%20knot%22&f=false.
- Transverse_knot wikiPageID "31481043".
- Transverse_knot wikiPageLength "1378".
- Transverse_knot wikiPageOutDegree "11".
- Transverse_knot wikiPageRevisionID "552522080".
- Transverse_knot wikiPageWikiLink Bijection.
- Transverse_knot wikiPageWikiLink Category:Knots_and_links.
- Transverse_knot wikiPageWikiLink Contact_geometry.
- Transverse_knot wikiPageWikiLink Embedding.
- Transverse_knot wikiPageWikiLink Equivalence_relation.
- Transverse_knot wikiPageWikiLink Isomorphism.
- Transverse_knot wikiPageWikiLink Legendrian_knot.
- Transverse_knot wikiPageWikiLink Mathematics.
- Transverse_knot wikiPageWikiLink N-sphere.
- Transverse_knot wikiPageWikiLink Tangent_vector.
- Transverse_knot wikiPageWikiLink Transversality_theorem.
- Transverse_knot wikiPageWikiLinkText "Transverse knot".
- Transverse_knot wikiPageWikiLinkText "transverse knot".
- Transverse_knot wikiPageUsesTemplate Template:Cite_book.
- Transverse_knot wikiPageUsesTemplate Template:Knottheory-stub.
- Transverse_knot wikiPageUsesTemplate Template:Reflist.
- Transverse_knot subject Category:Knots_and_links.
- Transverse_knot hypernym Transverse.
- Transverse_knot comment "In mathematics, a transverse knot is a smooth embedding of a circle into a three-dimensional contact manifold such that the tangent vector at every point of the knot is transverse to the contact plane at that point.Any Legendrian knot can be C0-perturbed in a direction transverse to the contact planes to obtain a transverse knot.".
- Transverse_knot label "Transverse knot".
- Transverse_knot sameAs Q7835433.
- Transverse_knot sameAs m.0glsxph.
- Transverse_knot sameAs Q7835433.
- Transverse_knot wasDerivedFrom Transverse_knot?oldid=552522080.
- Transverse_knot isPrimaryTopicOf Transverse_knot.