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On simple-minded systems over representation-finite self-injective algebras
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On simple-minded systems over representation-finite self-injective algebras
classification
math.RT
keywords
systemsimple-mindedorthogonalrepresentation-finiteself-injectivestmodalgebraalgebraically
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Let $A$ be a representation-finite self-injective algebra over an algebraically closed field $k$. We give a new characterization for an orthogonal system in the stable module category $A$-$\stmod$ to be a simple-minded system. As a by-product, we show that every Nakayama-stable orthogonal system in $A$-$\stmod$ extends to a simple-minded system.
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