Duality and de Rham cohomology for graded D-modules

Abstract

We consider the (graded) Matlis dual (M) of a graded -module M over the polynomial ring R = k[x1, …, xn] (k is a field of characteristic zero), and show that it can be given a structure of -module in such a way that, whenever kHidR(M) is finite, then HidR(M) is k-dual to Hn-idR((M)). As a consequence, we show that if M is a graded -module such that HndR(M) is a finite-dimensional k-space, then k(HndR(M)) is the maximal integer s for which there exists a surjective -linear homomorphism M → Es, where E is the top local cohomology module Hn(x1, …, xn)(R). This extends a recent result of Hartshorne and Polini on formal power series rings to the case of polynomial rings; we also apply the same circle of ideas to provide an alternate proof of their result. When M is a finitely generated graded -module such that kHidR(M) is finite for some i, we generalize the above result further, showing that HidR(M) is k-dual to n-i(M, ).