On modular categories O for quantized symplectic resolutions

Abstract

In this paper we study highest weight and standardly stratified structures on modular analogs of categories O over quantizations of symplectic resolutions and show how to recover the usual categories O (reduced mod p 0) from our modular categories. More precisely, we consider a conical symplectic resolution that is defined over a finite localization of Z and is equipped with a Hamiltonian action of a torus T that has finitely many fixed points. We consider algebras Aλ of global sections of a quantization in characterstic p 0, where λ is a parameter. Then we consider a category Oλ consisting of all finite dimensional T-equivariant Aλ-modules. We show that for λ lying in a p-alcove \,p\!A, the category Oλ is highest weight (in some generalized sense). Moreover, we show that every face of \,p\!A that survives in \,p\!A/p when p→ ∞ defines a standardly stratified structure on Oλ. We identify the associated graded categories for these standardly stratified structures with reductions mod p of the usual categories O in characteristic 0. Applications of our construction include computations of wall-crossing bijections in characteristic p and the existence of gradings on categories O in characteristic 0.