Arithmetic Groups (Banff, Alberta, April 14–19, 2013) edited by Kai-Uwe Bux, Dave Witte Morris, Gopal Prasad, and Andrei Rapinchuk Abstract. We present detailed summaries of the talks that were given during a weeklong - Unipotent - Document - PDFSEARCH.IO - Document Search Engine

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	Arithmetic Groups (Banff, Alberta, April 14–19, 2013) edited by Kai-Uwe Bux, Dave Witte Morris, Gopal Prasad, and Andrei Rapinchuk Abstract. We present detailed summaries of the talks that were given during a weeklong Add to Reading List Document Date: 2013-10-10 14:30:39 Open Document File Size: 400,26 KB Share Result on Facebook Company SL2 / Tits and Curtis / Kac / Borel / / Event Reorganization / / Facility University of Virginia / University of Bielefeld / Bruhat-Tits building / Stanford University / Banff International Research Station / University of Lethbridge / University of Utah / University of Gießen / University of Michigan / / IndustryTerm ambient / affirmative solutions / algebraic / higher rank arithmetic groups / arithmetic applications / root systems / / Organization University of Gießen / University of Bielefeld / University of Michigan / University of Lethbridge / University of Virginia / University of Utah / Stanford University / / Person Igor Rapinchuk / Andrei Rapinchuk / Vincent Emery / Gopal Prasad / Alan Reid / Vladimir Chernousov / Kevin Wortman / Mikhail Belolipetsky / Alireza Salehi Golsefidy / Ted Chinburg / Gabber / Pavel Zalesskii / Bertrand Remy / Kai-Uwe Bux / T. N. Venkataramana / Christopher Voll / Brian Conrad / Matthew Stover / Dave Witte Morris / Benjamin Klopsch / Stefan Witzel / / ProvinceOrState Alberta / Virginia / Michigan / Utah / / SportsLeague Stanford University / / Technology Euclidean algorithm / CAT / acting on CAT / / URL http / SocialTag Lattice Congruence subgroup Arithmetic group Representation theory Group scheme Gopal Prasad Fundamental group Orbifold Unipotent Abstract algebra