A proof of Harish-Chandra's integrability theorem for cuspidal representations of GLn( F((t)))
Abstract
Consider the Chevalley map p:gl n(F) (gln//GLn)(F), where F=F((t)). We show that the push forward via p of every smooth compactly supported measure on gln(F) is a measure whose density belongs to Lq for every finite q. As a consequence, using the main result of [AGKSc], we obtain local integrability for Harish--Chandra's characters of irreducible cuspidal representations of GLn(F).
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