Automorphisms and Ideals of Noncommutative Deformations of C2/Z2

Abstract

Let Oτ() be a family of algebras quantizing the coordinate ring of C2 / , where is a finite subgroup of SL2(C), and let G be the automorphism group of Oτ. We study the natural action of G on the space of right ideals of Oτ (equivalently, finitely generated rank 1 projective Oτ-modules). It is known that the later can be identified with disjoint union of algebraic (quiver) varieties, and this identification is G-equivariant. In the present paper, when Z2, we show that the G-action on each quiver variety is transitive. We also show that the natural embedding of G into Pic(Oτ), the Picard group of Oτ, is an isomorphism. These results are used to prove that there are countably many non-isomorphic algebras Morita equivalent to Oτ, and explicit presentation of these algebras are given. Since algebras Oτ(Z2) are isomorphic to primitive factors of U(sl2), we obtain a complete description of algebras Morita equivalent to primitive factors. A structure of the group G, where is an arbitrary cyclic group, is also investigated. Our results generalize earlier results obtained for the (first) Weyl algebra A1.