\"Uber die von einem Ideal I ⊂ R erzeugten R-Moduln II

Abstract

Let (R, m) be a commutative noetherian local ring and I an ideal of R. Let P be the class of all I-generated R-modules M (i.e. there is an epimorphism I() M) and let S be the class of all I-cogenerated R-modules N (i.e. there is a monomorphism N (I) with I = HomR(I,E)). We give a complete description of all injective and flat modules in P and S. We show that (S,P) forms a dual pair in the sense of Mehdi--Prest(2015) and that P is always closed under pure submodules. We determine all ideals I for which P is closed under submodules, S is closed under factor modules and P (resp. S) is closed under group extensions. In the last section, we examine the submodules γ(M) = Σ\U ⊂ M \,|\, U ∈ P\ and (M) = \V ⊂ M \,|\, M/V ∈ S\ for all R-modules M, and we specify their explicit structure in special cases.