A note on the Matlis dual of a certain injective hull

Abstract

Let (R,m) denote a local ring with E = ER(R/m) the injective hull of the residue field. Let p ∈ R denote a prime ideal with R/p = 1, and let ER(R/p) be the injective hull of R/p. As the main result we prove that the Matlis dual R(ER(R/p), E) is isomorphic to Rp, the completion of Rp, if and only if R/p is complete. In the case of R a one dimensional domain there is a complete description of Q R R in terms of the completion R.