English

Duality in Derived Category $\mathcal O^\infty$

Representation Theory 2023-12-25 v1 Group Theory Number Theory Rings and Algebras

Abstract

Let G\bf{G} be a split connected reductive group over a finite extension FF of Qp\mathbb Q_p, and let TBG\bf{T} \subset \bf{B} \subset \bf{G} be a maximal split torus and a Borel subgroup, respectively. Denote by G=G(F)G = {\bf{G}}(F) and B=B(F)B= {\bf{B}}(F) their groups of FF-valued points and by g=Lie(G)\mathfrak g = \rm Lie(G) and b=Lie(B)\mathfrak b = \rm Lie(B) their Lie algebras. Let O\mathcal O^\infty be the thick category O\mathcal O for (g,b)(\mathfrak g,\mathfrak b), and denote by OalgO\mathcal{O}^\infty_{\rm alg} \subset \mathcal{O}^\infty the full subcategory consisting of objects whose weights are in X(T)X^*(\bf{T}). Both are Serre subcategories of the category of all UU-modules, where U=U(g)U = U(\mathfrak g). We show first that the functor Dg=RHomU(,U)\mathbb D^\mathfrak g = \rm RHom_U(-,U) preserves Db(U)OalgD^b(U)_{\mathcal{O}^\infty_{\rm alg}}, and we deduce from a result of Coulembier-Mazorchuk that the latter category is equivalent to Db(Oalg)D^b(\mathcal O^\infty_{\rm alg}).

Keywords

Cite

@article{arxiv.2312.14282,
  title  = {Duality in Derived Category $\mathcal O^\infty$},
  author = {Cemile Kurkoglu},
  journal= {arXiv preprint arXiv:2312.14282},
  year   = {2023}
}
R2 v1 2026-06-28T13:59:17.485Z