Localized representation theory, 2
Event details
| Date | 17.06.2014 |
| Hour | 14:15 › 15:15 |
| Speaker | Paul Nelson (EPFL) |
| Location | |
| Category | Conferences - Seminars |
The talk will concern an aspect of the representation theory of Lie groups. It is a continuation of a talk from two weeks ago in Nicolas Monod's seminar, but should be mostly self-contained.
In that talk I described an asymptotic classification of "approximately equivariant operators" when restricted to "localized vectors" in certain irreducible unitary representations of certain Lie groups, and indicated some applications to establishing the invariance of limiting measures arising in semiclassical analysis and number theory.
In this talk I will recall that result and describe its proof in some simple cases. No background will be assumed. The argument is of a microanalytic flavor and inspired by the method of coadjoint orbits.
In that talk I described an asymptotic classification of "approximately equivariant operators" when restricted to "localized vectors" in certain irreducible unitary representations of certain Lie groups, and indicated some applications to establishing the invariance of limiting measures arising in semiclassical analysis and number theory.
In this talk I will recall that result and describe its proof in some simple cases. No background will be assumed. The argument is of a microanalytic flavor and inspired by the method of coadjoint orbits.
Practical information
- Informed public
- Free
Contact
- Monique Kiener