On self-orthogonal modules in Iwanaga-Gorenstein rings
Abstract
Let A be an Iwanaga-Gorenstein ring. Enomoto conjectured that a self-orthogonal A-module has finite projective dimension. We prove this conjecture for A having the property that every indecomposable non-projective maximal Cohen-Macaulay module is periodic. This answers a question of Enomoto and shows the conjecture for monomial quiver algebras and hypersurface rings.
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