Schubert cells and Whittaker functionals for GL(n,R) part II: Existence via integration by parts

Abstract

We give a new proof of the existence of Whittaker functionals for principal series representation of GL(n,R), utilizing the analytic theory of distributions. We realize Whittaker functionals as equivariant distributions on GL(n,R), whose restriction to the open Schubert cell is unique up to a constant. Using a birational map on the Schubert cells, we show that the unique distribution on the open Schubert cell extends to a distribution on the entire space GL(n,R). This technique gives a proof of the analytic continuation of Jacquet integrals via integration by parts. We briefly discuss an application of the method to the Bessel functions on GL(n,R).

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