On the generic behavior of decomposition morphisms
Ulrich Thiel (University of Stuttgart)
Wednesday 21st January, 2015 16:00-17:00 Maths 516
Abstract
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 the same (in a precise sense) on an open subset of Spec(R), where the connection between the Grothendieck groups is set up by decomposition morphisms as defined by 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.
Add to your calendar
Download event information as iCalendar file (only this event)