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- Orbit_method abstract "In mathematics, the orbit method (also known as the Kirillov theory, the method of coadjoint orbits and by a few similar names) establishes a correspondence between irreducible unitary representations of a Lie group and its coadjoint orbits: orbits of the action of the group on the dual space of its Lie algebra. The theory was introduced by Kirillov (1961, 1962) for nilpotent groups and later extended by Bertram Kostant, Louis Auslander, Lajos Pukánszky and others to the case of solvable groups. Roger Howe found a version of the orbit method that applies to p-adic Lie groups. David Vogan proposed that the orbit method should serve as a unifying principle in the description of the unitary duals of real reductive Lie groups.".
- Orbit_method wikiPageID "4231851".
- Orbit_method wikiPageRevisionID "606356677".
- Orbit_method authorlink "Alexandre Kirillov".
- Orbit_method first "A. A.".
- Orbit_method hasPhotoCollection Orbit_method.
- Orbit_method id "O/o070020".
- Orbit_method last "Kirillov".
- Orbit_method year "1961".
- Orbit_method year "1962".
- Orbit_method subject Category:Representation_theory_of_Lie_groups.
- Orbit_method comment "In mathematics, the orbit method (also known as the Kirillov theory, the method of coadjoint orbits and by a few similar names) establishes a correspondence between irreducible unitary representations of a Lie group and its coadjoint orbits: orbits of the action of the group on the dual space of its Lie algebra.".
- Orbit_method label "Orbit method".
- Orbit_method sameAs m.0br8nk.
- Orbit_method sameAs Q7100049.
- Orbit_method sameAs Q7100049.
- Orbit_method wasDerivedFrom Orbit_method?oldid=606356677.
- Orbit_method isPrimaryTopicOf Orbit_method.