Alagoz, YusufBuyukasik, Engin2024-12-242024-12-2420210938-12791432-0622https://doi.org/10.1007/s00200-020-00482-4https://hdl.handle.net/20.500.12604/5969In this paper, we continue to study and investigate the homological objects related to s-pure and neat exact sequences of modules and module homomorphisms. A right module A is called max-flat if Tor(1)(R) (A, R/I) = 0 for any maximal left ideal I of R. A right module B is said to be max-cotorsion if Ext(R)(1)(A, B) = 0 for any max-flat right module A. We characterize some classes of rings such as perfect rings, max-injective rings, SF rings and max-hereditary rings by max-flat and max-cotorsion modules. We prove that every right module has a max-flat cover and max-cotorsion envelope. We show that a left perfect right max-injective ring R is QF if and only if maximal right ideals of R are finitely generated. The max-flat dimensions of modules and rings are studied in terms of right derived functors of -circle times-. Finally, we study the modules that are injective and flat relative to s-pure exact sequences.eninfo:eu-repo/semantics/openAccess(Max-)flat modulesMax-cotorsion modules(s-)pure submoduleSP-flat modulesMax-hereditary ringsQuasi-Frobenius ringsArticle323195215Q4WOS:000605558800002Q12-s2.0-8509878979110.1007/s00200-020-00482-4