Preprojective algebras, differential operators and a Conze embedding for deformations of Kleinian singularities

Abstract.

For any associative algebra A over a field K we define a family of algebras \( \Pi^\lambda(A) \) for \( \lambda \in K \,\otimes_{\Bbb Z}\,{\rm K_0}(A) \). In case A is the path algebra of a quiver, one recovers the deformed preprojective algebra introduced by M. P. Holland and the author. In case A is the coordinate ring of a smooth curve, the family includes the ring of differential operators for A and the coordinate ring of the cotangent bundle for Spec A. In case A is quasi-free and \( \Omega^1 \) A is a finitely generated A-A-bimodule we prove that \( \Pi^\lambda(A) \) is well-behaved under localization. We use this to prove a Conze embedding for deformations of Kleinian singularities.