Deformation of quotients on a product

Abstract

We consider the general problem of deforming a surjective map of modules f : E F over a coproduct sheaf of rings B=B1 A B2 when the domain module E = B1 A E2 is obtained via extension of scalars from a B2-module E2. Assuming B1 is flat over A, we show that the Atiyah class morphism F B/B2 F[1] in the derived category D(B) factors naturally through (the shift of) a morphism β : f B/B2 F. We describe the obstruction to lifting f over a (square zero) extension B1' B1 in terms of β and the class of the extension. As an application, we use the reduced Atiyah class to construct a perfect obstruction theory on the Quot scheme of a vector bundle on a smooth curve (and more generally).