Towards the Derived Jacquet-Emerton Module Functor
Abstract
Let G be a p-adic Lie group associated to a connected reductive group over Qp. Let P be a parabolic subgroup of G and let M be a Levi quotient of P. In this paper, we define a δ-functor HJP from the category of admissible locally analytic G-representations to the category of essentially admissible locally analytic M-representations that extends the Jacquet-Emerton module functor JP defined by Emerton.
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