Injective Objects of Monomorphism Categories
Abstract
For an acyclic quiver Q and a finite-dimensional algebra A, we give a unified form of the indecomposable injective objects in the monomorphism category Mon(Q,A) and prove that Mon(Q, A) has enough injective objects. As applications, we show that for a given self-injective algebra A, a tilting object in the stable category A-mod induces a natural tilting object in the stable monomorphism category Mon(Q,A). We also realize the singularity category of the algebra kQk A as the stable monomorphism category of the module category of A.
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