On certain classes of modules over group algebras

Abstract: In this paper, we examine the relation between certain subclasses of the classes of Gorenstein projective, Gorenstein flat and Gorenstein injective modules over a group algebra, which consist of the cofibrant, cofibrant-flat and fibrant modules respectively. These subclasses have all structural properties that the Gorenstein classes are known to have, regarding the existence of complete cotorsion pairs and various approximations between them. Furthermore, these subclasses have certain properties, which are conjecturally anticipated to hold for the Gorenstein classes as well. Since the Gorenstein classes are actually equal to the corresponding subclasses for large families of groups, we thus obtain (indirectly) some information about the Gorenstein classes over these groups.