Basics on Automorphic representations
In the winter term 2022/23 we want to learn the basics about automorphic representations. We follow closely the first chapters of the recent book An introduction to automorphic representations with a view toward trace formulae by Getz and Hahn.
Here is the program.
The seminar takes place on Wednesdays 10:15 - 11:45 in room G.14.34 (BUW).
| 1. Discussion and distribution of the talks | 19.10.22 | All |
| 2. Adeles | 26.10.22 | Lucas |
| 3. The Haar measure | 02.11.22 | Oliver |
| 4. The Adelic quotient | 09.11.22 | Mattia |
| 5. Automorphic Representations in the L^2-sense | 16.11.22 | Sonia |
| 6. Smooth vectors and representations of compact groups | 23.11.22 | Dennis |
| 7. (\mathfrak{g}, K)-modules, infinitesimal characters, and classification of (\mathfrak{g}, K)-modules for GL_{2, \mathbb R} | 30.11.22 | Jens E. |
| 8. Smooth and admissble representations | 07.12.22 | Sascha |
| 9. Unramified Hecke-Algebra and Flath's Theorem | 14.12.22 | Kay |
| 10. Automorphic forms and -representations | 21.12.22 | Fei |
| 11. Cuspidal automorphic representations and modular forms I | 11.01.23 | Matthias |
| 12. Cuspidal automorphic representations and modular forms II | 18.01.23 | Matthias |
| 13. Unramified representations, the Satake Isomorphism, and the Langlands dual group | 25.01.23 | Marc |
| 14. Satake Isomorphism for unramified groups and principal series | 01.02.23 | Georg |
zuletzt bearbeitet am: 26.03.2023
