On modular representations of GL_2(L) for unramified L
Christophe Breuil (CNRS, Université Paris-Sud)
Abstract: Let p be a prime number and L a finite unramified extension of Q_p. We give a survey of past and new results on smooth admissible representations of GL_2(L) that appear in mod p cohomology. This is joint work with Florian Herzig, Yongquan Hu, Stefano Morra and Benjamin Schraen.
algebraic geometrynumber theory
Audience: researchers in the topic
Comments: The organizers of the Beijing-Paris-Tokyo Arithmetic Geometry Seminar stands in solidarity with our black colleagues, in the US and around the world, in the struggle against the plague of systemic racism. In response to the call launched by #ShutDownAcademia, #ShutDownStem and #Strike4BlackLives movements, we decided, in agreement with the speaker, to move Christophe Breuil's lecture from Wednesday June 10 to Wednesday June 17 at 10:30 am (Paris). The lecture will be given by webinar. If you have not yet registered, you can do so by filling in the form below before June 16.
Beijing-Paris-Tokyo arithmetic geometry webinar
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| Organizers: | Ahmed Abbes*, Yongquan Hu*, Fabrice Orgogozo, Takeshi Saito, Atsushi Shiho, Ye Tian, Takeshi Tsuji, Weizhe Zheng* |
| *contact for this listing |