Some remarks about FPn-projective and FPn-injective modules

Abstract

Let R be a ring. In MD4 Mao and Ding defined an special class of R-modules that they called \( FPn \)-projective R-modules. In this paper, we give some new characterizations of \( FPn \)-projective R-modules and strong n-coherent rings. Some known results are extended and some new characterizations of the \( FPn \)-injective global dimension in terms of \( FPn \)-projective R-modules are obtained. Using the \( FPn \)-projective dimension of an R-module defined by Ouyang, Duan and Li in Ouy we introduce a slightly different \( FPn \)-projective global dimension over the ring R which measures how far away the ring is from being Noetherian. This dimension agrees with the (n,0)-projective global dimension of Ouy when the ring in question is strong n-coherent.