Advanced Class Logic
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Thu, 20/10/2011 11:00 |
Jamshid Derakhshan (Oxford) |
Advanced Class Logic  |
SR2 |
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This is joint work with Uri Onn. We use motivic integration to get the growth rate of the sequence consisting of the number of conjugacy classes in quotients of G(O) by congruence subgroups, where $G$ is suitable algebraic group over the rationals and $O$ the ring of integers of a number field. The proof uses tools from the work of Nir Avni on representation growth of arithmetic groups and results of Cluckers and Loeser on motivic rationality and motivic specialization. |
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Thu, 27/10/2011 11:00 |
Vincenzo Mantova (Pisa and Oxford) |
Advanced Class Logic |
SR2 |
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Thu, 10/11/2011 11:00 |
Adam Harris (Oxford) |
Advanced Class Logic |
SR2 |
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Thu, 17/11/2011 11:00 |
Adam Harris (Oxford) |
Advanced Class Logic |
SR2 |
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Thu, 01/12/2011 11:00 |
Austin Yim (Oxford) |
Advanced Class Logic |
SR2 |
