Gorenstein homological dimensions for extriangulated categories

Abstract

Let (C,E,s) be an extriangulated category with a proper class of E-triangles. The authors introduced and studied -Gprojective and -Ginjective in HZZ. In this paper, we discuss Gorenstein homological dimensions for extriangulated categories. More precisely, we first give some characterizations of -Gprojective dimension by using derived functors on C. Second, let P() (resp. I()) be a generating (resp. cogenerating) subcategory of C. We show that the following equality holds under some assumptions: \-G pdM \ | \ for \ any \ M∈C\=\-G idM \ | \ for \ any \ M∈C\, where -G pdM (resp. -G idM) denotes -Gprojective (resp. -Ginjective) dimension of M. As an application, our main results generalize their work by Bennis-Mahdou and Ren-Liu. Moreover, our proof is not far from the usual module or triangulated case.