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 over quantizations of symplectic resolutions and show how to recover the usual categories (reduced mod ) from our modular categories. More precisely, we consider a conical symplectic resolution that is defined over a finite localization of and is equipped with a Hamiltonian action of a torus that has finitely many fixed points. We consider algebras of global sections of a quantization in characterstic , where is a parameter. Then we consider a category consisting of all finite dimensional -equivariant -modules. We show that for lying in a {\it p-alcove} , the category is highest weight (in some generalized sense). Moreover, we show that every face of that survives in when defines a standardly stratified structure on . We identify the associated graded categories for these standardly stratified structures with reductions mod of the usual categories in characteristic . Applications of our construction include computations of wall-crossing bijections in characteristic and the existence of gradings on categories in characteristic .
Keywords
Cite
@article{arxiv.1712.07726,
title = {On modular categories O for quantized symplectic resolutions},
author = {Ivan Losev},
journal= {arXiv preprint arXiv:1712.07726},
year = {2021}
}
Comments
50 pages; v2 58 pages, various mistakes fixed and exposition improved