Chiral Koszul duality
Algebraic Geometry
2013-09-03 v4 Algebraic Topology
Quantum Algebra
Abstract
We extend the theory of chiral and factorization algebras, developed for curves by Beilinson and Drinfeld in \cite{bd}, to higher-dimensional varieties. This extension entails the development of the homotopy theory of chiral and factorization structures, in a sense analogous to Quillen's homotopy theory of differential graded Lie algebras. We prove the equivalence of higher-dimensional chiral and factorization algebras by embedding factorization algebras into a larger category of chiral commutative coalgebras, then realizing this interrelation as a chiral form of Koszul duality. We apply these techniques to rederive some fundamental results of \cite{bd} on chiral enveloping algebras of -Lie algebras.
Cite
@article{arxiv.1103.5803,
title = {Chiral Koszul duality},
author = {John Francis and Dennis Gaitsgory},
journal= {arXiv preprint arXiv:1103.5803},
year = {2013}
}