Interplay between homological dimensions of a complex and its right derived section

Abstract

Let (R,m) be a commutative Noetherian local ring, a be a proper ideal of R and M be an R-complex in D(R). We prove that if M∈Df(R) (respectively, M∈Df(R)), then idRRa(M)=idR M (respectively, fdRRa(M)=fdR M). Next, it is proved that the right derived section functor of a complex M∈D(R) (R is not necessarily local) can be computed via a genuine left-bounded complex G M of Gorenstein injective modules. We show that if R has a dualizing complex and M is an R-complex in Df(R), then GfdRRa(M)=GfdR M and GidRRa(M)=GidR M. Also, we show that if M is a relative Cohen-Macaulay R-module with respect to a (respectively, Cohen-Macaulay R-module of dimension n), then GfdRHhtMaa(M)=GfdRM+n (respectively, GidRHnm(M)=GidRM-n). The above results generalize some known results and provide characterizations of Gorenstein rings.