Monomorphism operator and perpendicular operator

Abstract

For a quiver Q, a k-algebra A, and a full subcategory X of A-mod, the monomorphism category Mon(Q, X) is introduced. The main result says that if T is an A-module such that there is an exact sequence 0→ Tm→...→ T0→ D(AA)→ 0 with each Ti∈ add (T), then Mon(Q, \ T) = \ (kQk T); and if T is cotilting, then kQk T is a unique cotilting -module, up to multiplicities of indecomposable direct summands, such that Mon(Q, \ T)= \ (kQ k T). As applications, the category of the Gorenstein-projective (kQkA)-modules is characterized as Mon(Q, GP(A)) if A is Gorenstein; the contravariantly finiteness of Mon(Q, X) can be described; and a sufficient and necessary condition for Mon(Q, A) being of finite type is given.