Relative Gorenstein objects in abelian categories

Abstract

Let A be an abelian category. For a pair (X,Y of classes of objects in A, we define the weak and the (X,Y)-Gorenstein relative projective objects in A. We point out that such objects generalize the usual Gorenstein projective objects and others generalizations appearing in the literature as Ding-projective, Ding-injective, X-Gorenstein projective, Gorenstein AC-projective and GC-projective modules and Cohen-Macaulay objects in abelian categories. We show that the principal results on Gorenstein projective modules remains true for the weak and the (X,Y-Gorenstein relative objects. Furthermore, by using Auslander-Buchweitz approximation theory, a relative version of Gorenstein homological dimension is developed. Finally, we introduce the notion of W-cotilting pair in the abelian category A, which is very strong connected with the cotorsion pairs related with relative Gorenstein objects in A. It is worth mentioning that the W-cotilting pairs generalize the notion of cotilting objects in the sense of L. Angeleri H\"ugel and F. Coelho.