On completion of graded D-modules

Abstract

Let R = k[x1, …, xn] be a polynomial ring over a field k of characteristic zero and be the formal power series ring k[[x1, …, xn]]. If M is a -module over R, then R M is naturally a -module over . Hartshorne and Polini asked whether the natural maps Hi(M) Hi( R M) (induced by M R M) are isomorphisms whenever M is graded and holonomic. We give a positive answer to their question, as a corollary of the following stronger result. Let M be a finitely generated graded -module: for each integer i such that kHi(M)<∞, the natural map Hi(M) Hi( R M) (induced by M R M) is an isomorphism.