Monomorphism categories, cotilting theory, and Gorenstein-projective modules

Abstract

The monomorphism category Sn( X) is introduced, where X is a full subcategory of the module category A-mod of Artin algebra A. The key result is a reciprocity of the monomorphism operator Sn and the left perpendicular operator : for a cotilting A-module T, there is a canonical construction of a cotilting Tn(A)-module m(T), such that Sn( T) = \ m(T). As applications, Sn( X) is a resolving contravariantly finite subcategory in Tn(A)-mod with Sn( X) = Tn(A)-mod if and only if X is a resolving contravariantly finite subcategory in A-mod with X = A-mod. For a Gorenstein algebra A, the category Tn(A)- Gproj of Gorenstein-projective Tn(A)-modules can be explicitly determined as Sn( A). Also, self-injective algebras A can be characterized by the property Tn(A)- Gproj = Sn(A). Using Sn(A)= \ m(D(AA)), a characterization of Sn(A) of finite type is obtained.