Presentations of Categories of Modules using the Cautis-Kamnitzer-Morrison Principle

Abstract

We use duality theorems to obtain presentations of some categories of modules. To derive these presentations we generalize a result of Cautis-Kamnitzer-Morrison [arXiv:1210.6437v4]: Let g be a reductive Lie algebra, and A an algebra, both over C. Consider a (g , A)-bimodule P in which (a) P has a multiplicity free decomposition into irreducible (g , A)-bimodules. (b) P is "saturated" i.e. for any irreducible g-module V, if every weight of V is a weight of P, then V is a submodule of P. We show that statements (a) and (b) are necessary and sufficient conditions for the existence of an isomorphism of categories between the full subcategory of Rep A whose objects are g-weight spaces of P, and a quotient of the category version of Lusztig's idempotented form, U g, formed by setting to zero all morphisms factoring through a collection of objects in U g depending on P. This is essentially a categorical version of the identification of generalized Schur algebras with quotients of Lusztig's idempotented forms given by Doty in [arXiv:math/0305208]. Applied to Schur-Weyl Duality we obtain a diagrammatic presentation of the full subcategory of Rep Sd whose objects are direct sums of permutation modules, as well as an explicit description of the -product of morphisms between permutation modules. Applied to Brauer-Schur-Weyl Duality we obtain diagrammatic presentations of subcategories of Rep Bd(- 2n) and Rep Br,s(n) whose Karoubi completion is the whole of Rep Bd(- 2n) and Rep Br,s(n) respectively.