Intertwining operators in the Takeda-Wood isomorphism
Abstract
Over any non-Archimedean local field of characteristic not equal to 2, Takeda and Wood constructed types for the two blocks containing the even and odd Weil representations of the metaplectic group G, and identified the resulting Hecke algebras H with the Iwahori-Hecke algebras of odd orthogonal groups G of the same rank. We describe normalized parabolic induction and Jacquet modules in terms of Hecke modules using a suitable variant of Bushnell-Kutzko theory. Furthermore, we match the standard intertwining operators of G and G by proving a variant of Gindikin-Karpelevich formula for G. As an application, we describe the behavior of normalized intertwining operators of G in these blocks under Aubert involution, reducing everything to the G side. This is mainly motivated by Arthur's local intertwining relations.
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