Monic representations and Gorenstein-projective modules
Abstract
Let be the path algebra of a finite quiver Q over a finite-dimensional algebra A. Then -modules are identified with representations of Q over A. This yields the notion of monic representations of Q over A. If Q is acyclic, then the Gorenstein-projective -modules can be explicitly determined via the monic representations. As an application, A is self-injective if and only if the Gorenstein-projective -modules are exactly the monic representations of Q over A.
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