Duality in Derived Category O∞
Abstract
Let G be a split connected reductive group over a finite extension F of Qp, and let T ⊂ B ⊂ G be a maximal split torus and a Borel subgroup, respectively. Denote by G = G(F) and B= B(F) their groups of F-valued points and by g = Lie(G) and b = Lie(B) their Lie algebras. Let O∞ be the thick category O for ( g, b), and denote by O∞ alg ⊂ O∞ the full subcategory consisting of objects whose weights are in X*(T). Both are Serre subcategories of the category of all U-modules, where U = U( g). We show first that the functor D g = RHomU(-,U) preserves Db(U)O∞ alg, and we deduce from a result of Coulembier-Mazorchuk that the latter category is equivalent to Db( O∞ alg).
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