The Second Adjointness Theorem for reductive p-adic groups

Details The Second Adjointness Theorem for reductive p-adic groups The Second Adjointness Theorem for reductive p-adic groups

2010-04-24

arxiv.org/abs/1004.4290v2

Mathematics

Representation Theory

Scientific paper

We prove that the Jacquet restriction functor for a parabolic subgroup of a reductive group over a non-Archimedean local field is right adjoint to the parabolic induction functor for the opposite parabolic subgroup, in the generality of smooth group representations on R-modules for any unital ring R in which the residue field characteristic is invertible. Correction: it turned out that the paper contains a mistake (in Lemma 3.4), which the authors have been unable to fix. This renders the proof of the main theorem incomplete.

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