Gorenstein injectivity of the section functor

Abstract

Let R be a commutative Noetherian ring of Krull dimension d admitting a dualizing complex D and let a be any ideal of R, we prove that a(G) is Gorenstein injective for any Gorenstein injective R-module G. Let (R, m) be a local ring and M be a finitely generated R-module. We show that Gid R m(M)<∞ if and only if GidR(MRR)<∞. We also show that if GfdR R m(M)<∞, then GfdRM<∞. Let (R, m) be a Cohen-Macaulay local ring and M be a Cohen-Macaulay module of dimension n. We prove that if H mn(M) is of finite G-injective dimension, then GidRH mn(M)=d-n. Moreover, we prove that if M is a Matlis reflexive strongly torsion free module of finite G-flat dimension, then GfdRM<∞, where M is m-adic completion.