The Weyl law for algebraic tori
Abstract
We give an asymptotic evaluation for the number of automorphic characters of an algebraic torus T with bounded analytic conductor. The analytic conductor which we use is defined via the local Langlands correspondence for tori by choosing a finite dimensional complex algebraic representation of the L-group of T. Our results therefore fit into a general framework of counting automorphic representations on reductive groups by analytic conductor.
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