Localization of the Parabolic Hecke Algebra at a Strictly Positive Element
Abstract
Let P be a parabolic subgroup with Levi M of a connected reductive group defined over a locally compact non-archimedean field F. Given a certain compact open subgroup of P(F), this note proves that the Hecke algebra H(M(F)) of M(F) with respect to M(F) is a left ring of fractions of the Hecke algebra H(P(F)) of P(F) with respect to . This leads to a characterization of H(P(F))-modules that come from H(M(F))-modules.
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