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VERSION:2.0
PRODID:-//Memento EPFL//
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SUMMARY:Counting cusp forms by analytic conductor
DTSTART:20150121T141500
DTEND:20150121T151500
DTSTAMP:20260408T033937Z
UID:9e535460194291da5b145f6970bfc4ff6595b35325d84da8d167a4f4
CATEGORIES:Conferences - Seminars
DESCRIPTION:Farrell Brumley\nAbstract: The problem of counting cusp forms 
 on the general linear group of bounded analytic conductor has long been po
 pularized by Sarnak. It is the automorphic analog of Schanuel's well-known
  theorem giving an asymptotic for the number of rational points on project
 ive space of bounded height. A precise asymptotic should\, moreover\, take
  its place as one of the most basic statistics in the theory of families o
 f cusp forms: the size of the universal family. In this talk I shall descr
 ibe recent progress on this problem obtained in collaboration with Dj. Mil
 icevic.
LOCATION:Room MA A3 30 http://plan.epfl.ch/?lang=en&room=MA+30
STATUS:CONFIRMED
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