Normalized intertwining operators and nilpotent elements in the Langlands dual group

Abstract

Let F be a local non-archimedian field and let G be a group of points of a split reductive group over F. For a parabolic subgroup P of G we set XP=G/[P,P]. For any two parabolics P and Q with the same Levi component M we construct an explicit unitary isomorphism L2(XP) L2(XQ) (which depends on a choice of an additive character of F). The formula for the above isomorphism involves the action of the principal nilpotent element in the Langlands dual group of M on the unipotent radicals of the corresponding dual parabolics. We use the above isomorphisms to define a new space (G,M) of functions on XP (which depends only on P and not on M). We explain how this space may be applied in order to reformulate in a slightly more elegant way the construction of L-functions associated with the standard representation of a classical group due to Gelbart, Piatetski-Shapiro and Rallis.

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