Symplectic frame bundle
http://dbpedia.org/resource/Symplectic_frame_bundle an entity of type: WikicatStructuresOnManifolds
In symplectic geometry, the symplectic frame bundle of a given symplectic manifold is the canonical principal -subbundle of the tangent frame bundle consisting of linear frames which are symplectic with respect to . In other words, an element of the symplectic frame bundle is a linear frame at point i.e. an ordered basis of tangent vectors at of the tangent vector space , satisfying and for . For , each fiber of the principal -bundle is the set of all symplectic bases of .
rdf:langString
rdf:langString
Symplectic frame bundle
xsd:integer
32050867
xsd:integer
1016737061
rdf:langString
InternetArchiveBot
rdf:langString
February 2020
rdf:langString
yes
rdf:langString
In symplectic geometry, the symplectic frame bundle of a given symplectic manifold is the canonical principal -subbundle of the tangent frame bundle consisting of linear frames which are symplectic with respect to . In other words, an element of the symplectic frame bundle is a linear frame at point i.e. an ordered basis of tangent vectors at of the tangent vector space , satisfying and for . For , each fiber of the principal -bundle is the set of all symplectic bases of . The symplectic frame bundle , a subbundle of the tangent frame bundle , is an example of reductive G-structure on the manifold .
xsd:nonNegativeInteger
2583