Gorenstein flatness and injectivity over Gorenstein rings. (Q931498)

Let \(R\) be a two-sided Noetherian ring with finite injective dimension from both sides. The authors prove that if \(I\subset R\) is a two-sided ideal such that \(R/I\) is a semi-simple ring then \(\text{r.Gfd}_R(R/I)=\text{l.Gid}_R(R/I)\), in particular, if \(R\) is commutative then \(\text{Gfd}_R(T)=\text{Gid}_R(T)\) for every simple \(R\)-module \(T\). It is also proved that if \(R\to S\) is a ring homomorphism and \(_SE\) is an injective cogenerator for the category of left \(S\)-modules then \(\text{r.Gfd}_R(S)=\text{l.Gid}_R(E)\).