Multivariable (,)-modules and smooth o-torsion representations

Abstract

Let G be a Qp-split reductive group with connected centre and Borel subgroup B=TN. We construct a right exact functor D from the category of smooth modulo pn representations of B to the category of projective limits of finitely generated \'etale (,)-modules over a multivariable (indexed by the set of simple roots) commutative Laurent-series ring. These correspond to representations of a direct power of Gal(Qp/Qp) via an equivalence of categories. Parabolic induction from a subgroup P=LPNP corresponds to a basechange from a Laurent-series ring in those variables with corresponding simple roots contained in the Levi component LP. D is exact and yields finitely generated objects on the category SPA of finite length representations with subquotients of principal series as Jordan-H\"older factors. Lifting the functor D to all (noncommuting) variables indexed by the positive roots allows us to construct a G-equivariant sheaf Yπ, on G/B and a G-equivariant continuous map from the Pontryagin dual π of a smooth representation π of G to the global sections Yπ,(G/B). We deduce that D is fully faithful on the full subcategory of SPA with Jordan-H\"older factors isomorphic to irreducible principal series.