Intersection of complete cotorsion pairs

Abstract

Given two (hereditary) complete cotorsion pairs (X1,Y1) and (X2,Y2) in an exact category with X1⊂eq Y2, we prove that ( Smd X1,X2 ,Y1 Y2) is also a (hereditary) complete cotorsion pair, where Smd X1,X2 is the class of direct summands of extension of X1 and X2. As an application, we construct complete cotorsion pairs, such as (^≤slant n,GI≤slant n), where GI≤slant n is the class of modules of Gorenstein injective dimension at most n. And we also characterize the left orthogonal class of exact complexes of injective modules and the classes of modules with finite Gorenstein projective, Gorenstein flat, and PGF dimensions.