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PRODID:-//Memento EPFL//
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SUMMARY:Lusztig slices and their quantizations
DTSTART:20140915T151500
DTEND:20140915T170000
DTSTAMP:20260407T114548Z
UID:c450878e28abe09acd39e70adb356ca0d51810bb6b9fe82088c9ce0a
CATEGORIES:Conferences - Seminars
DESCRIPTION:Joel Kamnitzer (Toronto/EPFL)\nLusztig slices are moduli space
 s of Hecke modifications of vector\nbundles on P^1.  They are important o
 bjects of study in geometric\nrepresentation theory as they appear natural
 ly in the geometric Satake\ncorrrespondence.  They are related to finite-
 type quiver varieties\nthrough the theory of symplectic duality.  In join
 t work with Webster\,\nWeekes\, and Yacobi\, we have found that they can b
 e quantized using a\nclass of algebras known as truncated shifted Yangians
 .  In my talk\, I\nwill introduce these varieties and their quantizations
  and explain how\nwe are trying to study the representation theory of thes
 e algebras.
LOCATION:MAA331 http://plan.epfl.ch/?zoom=20&recenter_y=5864114.95885&rece
 nter_x=731135.67708&layerNodes=fonds\,batiments\,labels\,information\,park
 ings_publics\,arrets_metro\,transports_publics&floor=3&q=MAA331
STATUS:CONFIRMED
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