On counting cuspidal automorphic representations for GSp(4)
Abstract
We find the number sk(p,) of cuspidal automorphic representations of GSp(4,AQ) with trivial central character such that the archimedean component is a holomorphic discrete series representation of weight k 3, and the non-archimedean component at p is an Iwahori-spherical representation of type and unramified otherwise. Using the automorphic Plancherel density theorem, we show how a limit version of our formula for sk(p,) generalizes to the vector-valued case and a finite number of ramified places.
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