A Few Comments On Matlis Duality

Abstract

For a Noetherian local ring (R, m) with p∈ (R) we denote ER(R/ p) by the R-injective hull of R/ p. We will show that it has an R p-module structure and there is an isomorphism ER(R/ p) ER p(R p/ pR p) where R p stands for the p-adic completion of R. Moreover for a complete Cohen-Macaulay ring R the module D(ER(R/ p)) is isomorphic to Rp provided that (R/ p)=1 and D(·) denotes the Matlis dual functor R(·, ER(R/ m)). Here Rp denotes the completion of R p with respect to the maximal ideal pR p. These results extend those of Matlis (see m) shown in the case of the maximal ideal m.