Given a cotorsion pair (X, Y) in an abelian category A, we define cotorsion pairs (XN,dgYN) and (dgXN, YN) in the category CN(A) of N-complexes on A. We prove that if the cotorsion pair (X, Y) is complete and hereditary in a bicomplete abelian category, then both of the induced cotorsion pairs are complete, compatible and hereditary. We also create complete cotorsion pairs (dwXN, (dwXN)⊥), (eXXN, (exXN)⊥) and (⊥(dwYN), dwYN), (X(exYN), exYN) in a termwise manner by starting with a cotorsion pair (X,Y) that is cogenerated by a set. As applications of these results, we obtain more abelian model structures from the cotorsion pairs.
Abstract We introduce the singularity category with respect to Ding projective modules, Db dpsg(R), as the Verdier quotient of Ding derived category Db DP(R) by triangulated subcategory Kb(DP), and give some triangle equivalences. Assume DP is precovering. We show that Db DP(R) ≌K-,dpb(DP) and Dbpsg(R) ≌ DbDdefect(R). We prove that each R-module is of finite Ding projective dimension if and only if Dbdpsg(R) = 0.
