Whittaker spaces for reducible unitary principal series representations of SL2(F)
Abstract
Let F be a p-adic field containing the full group of nth roots of 1 and let SL2(F) be the n-fold cover of SL2(F) constructed by Kubota. In this paper we compute the dimension of the space of Whittaker functionals of the two irreducible summands inside a reducible unitary genuine principal series representation of SL2(F). We also show how these dimensions change when the Whittaker character is modified. As an application we determine the action of the twisted Kazhdan-Patterson n-fold cover of GL2(F) on the two summands. We emphasize that our main results addresses both ramified and unramified representations and do not rely on the assumption that the cover is tame.
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