Perverse Equivalences and Dg-stable Combinatorics
Representation Theory
2020-01-03 v1 Combinatorics
Rings and Algebras
Abstract
Chuang and Rouquier describe an action by perverse equivalences on the set of bases of a triangulated category of Calabi-Yau dimension . We develop an analogue of their theory for Calabi-Yau categories of dimension and show it is equivalent to the mutation theory of -simple-minded systems. Given a non-positively graded, finite-dimensional symmetric algebra , we show that the differential graded stable category of has negative Calabi-Yau dimension. When is a Brauer tree algebra, we construct a combinatorial model of the dg-stable category and show that perverse equivalences act transitively on the set of -bases.
Keywords
Cite
@article{arxiv.2001.00193,
title = {Perverse Equivalences and Dg-stable Combinatorics},
author = {Jeremy Brightbill},
journal= {arXiv preprint arXiv:2001.00193},
year = {2020}
}
Comments
44 pages, 9 figures