Categorical Cell Decomposition of Quantized Symplectic Algebraic Varieties
Algebraic Geometry
2024-07-11 v3 Quantum Algebra
Symplectic Geometry
Abstract
We prove a new symplectic analogue of Kashiwara's Equivalence from D-module theory. As a consequence, we establish a structure theory for module categories over deformation quantizations that mirrors, at a higher categorical level, the Bialynicki-Birula stratification of a variety with an action of the multiplicative group. The resulting categorical cell decomposition provides an algebro-geometric parallel to the structure of Fukaya categories of Weinstein manifolds. From it, we derive concrete consequences for invariants such as K-theory and Hochschild homology of module categories of interest in geometric representation theory.
Cite
@article{arxiv.1311.6804,
title = {Categorical Cell Decomposition of Quantized Symplectic Algebraic Varieties},
author = {Gwyn Bellamy and Christopher Dodd and Kevin McGerty and Thomas Nevins},
journal= {arXiv preprint arXiv:1311.6804},
year = {2024}
}
Comments
Version 3. Updated to agree with the version accepted for publication