Ideals of Rings of Differential Operators on Algebraic Curves (With an Appendix by George Wilson)

Abstract

Let X be a complex smooth affine irreducible curve, and let D = D(X) be the ring of global differential operators on X. In this paper, we give a geometric classification of left ideals in D and study the natural action of the Picard group of D on the space J(D) of isomorphism classes of such ideals. We recall that, up to isomorphism in the Grothendieck group K0(D), the ideals of D are classified by the Picard group of X: there is a natural fibration γ: J(D) Pic(X), whose fibres are the stable isomorphism classes of ideals of D (see BW). In this paper, we refine this classification by describing the fibres of γ in terms of finite-dimensional algebraic varieties Cn(X, I), which we call the (generalized) Calogero-Moser spaces. We define these varieties as representation varieties of deformed preprojective algebras over a certain extension of the ring of regular functions on X . As in the classical case (see Wi), we prove that Cn(X, I) are smooth affine irreducible varieties of dimension 2n. Our results generalize the description of left ideals of the first Weyl algebra A1(C) in BW1, BW2; however, our methods are quite different.