Fundamental vector field
In the study of mathematics and especially differential geometry, fundamental vector fields are an instrument that describes the infinitesimal behaviour of a smooth Lie group action on a smooth manifold. Such vector fields find important applications in the study of Lie theory, symplectic geometry, and the study of Hamiltonian group actions.
Link from a Wikipage to another Wikipage
Wikipage redirect
primaryTopic
Fundamental vector field
In the study of mathematics and especially differential geometry, fundamental vector fields are an instrument that describes the infinitesimal behaviour of a smooth Lie group action on a smooth manifold. Such vector fields find important applications in the study of Lie theory, symplectic geometry, and the study of Hamiltonian group actions.
has abstract
En géométrie différentielle, u ...... toriel sur un fibré principal.
@fr
In the study of mathematics an ...... of Hamiltonian group actions.
@en
Wikipage page ID
page length (characters) of wiki page
Wikipage revision ID
994,807,149
Link from a Wikipage to another Wikipage
label
Champ vectoriel fondamental
@fr
Fundamental vector field
@en
wikiPageUsesTemplate
hypernym
type
comment
En géométrie différentielle, u ...... toriel sur un fibré principal.
@fr
In the study of mathematics an ...... of Hamiltonian group actions.
@en