The orbit method of Kirillov is an approximate correspondence between irreducible representations of a Lie group and symplectic manifolds on which that group acts. We introduce this method and describe some its applications, emphasizing analytic questions motivated by problems in the theory of automorphic forms.
Lie group I, Representation theory up to some extent
This file contains exercises (also see course note) and solutions. It will be updated every week with new exercises and solutions from previous week.
| Time | Room | |||
|---|---|---|---|---|
| Lecture | Wed 08:00-10:00 | HG G 26.5 | ||
| Exercise | Thu 15:00-16:00 | HG G 3 |