Non-homogeneous Koszul duality in representation theory
Abstract
Motivated by the representation theory of symplectic reflection algebras, deformed preprojective algebras, and graded Hecke algebras, we consider filtered algebras U whose associated graded is Koszul. The Koszul dual of U, as defined by Positselski, is a curved dg-algebra. We establish an exact equivalence between the unbounded derived category of U and an explicit quotient of the homotopy category of injective modules over the dual curved dg-algebra. This recovers a special case of a result of Positselski. In the case where U has finite global dimension, the quotient is trivial and hence the unbounded derived category of U is equivalent to the homotopy category of injective modules over the dual curved dg-algebra.
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