|Joint IAS/Princeton University Number Theory Seminar|
|Topic:||The Weyl law for algebraic tori|
|Date:||Tuesday, March 13|
|Time/Room:||4:45pm - 5:45pm/Simonyi Hall 101|
A basic but difficult question in the analytic theory of automorphic forms is: given a reductive group G and a representation r of its L-group, how many automorphic representations of bounded analytic conductor are there? In this talk I will present an answer to this question in the case that G is a torus over a number field.