Existence of covers and envelopes of a left orthogonal class and its right orthogonal class of modules

Abstract

In this paper, we investigate the notions of X-projective, X-injective and X-flat modules and give some characterizations of these modules, where X is a class of left R-modules. We prove that the class of all X-projective modules is Kaplansky. Further, if the class of all X-projective R-modules is closed under direct limits, we show the existence of X-projective covers and X-injective envelopes over a X-hereditary ring R. Moreover, we decompose a X-projective module into a projective and a coreduced X-projective module over a self X-injective and X-hereditary ring. Finally, we prove that every module has a W-injective precover over a coherent ring R, where W is the class of all pure projective modules.