Orateur(s) | Ulrich THIEL - Kaiserslautern,
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Titre | Decomposition morphisms are generically trivial |
Date | 05/06/2014 |
Horaire | 10:30 à 11:30 |
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Diffusion | |
Résume | In my talk I will address a natural geometric question emerging when trying to compare the specialization $A(0)=A^K$ of a finite-dimensional algebra over a normal noetherian ring $R$ with quotient field K in the generic point $(0)$ of $Spec(R)$ to an arbitrary specialization $A(P)$ in a prime ideal $P$ of $R$. I will show that in case $A(P)$ splits for all $P$, the Grothendieck groups of $A^K$ and $A(P)$ are essentially the same on an open subset of $Spec(R)$, where the connection between the Grothendieck groups is set up by decomposition morphisms in the sense of Geck-Rouquier. This result is a nice tool for studying algebras involving parameters like Hecke algebras and Cherednik algebras. The proof uses both algebraic and topological arguments. |
Salle | 11 rue Pierre et Marie Curie - 75005 Paris |
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