The vanishing of self-extensions over n-symmetric algebras of quasitilted type

Published 3 Jul 2014 in math.RA and math.RT | (1407.1062v1)

Abstract: A ring R satisfies the Generalized Auslander-Reiten Condition if any R-module M with no self-extensions in degrees higher than m must have projective dimension at most m. We prove that this condition is satisfied by all n-symmetric algebras of quasitilted type- a broad class of self-injective algebras where every module is periodic under the Nakayama automorphism.

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The vanishing of self-extensions over n-symmetric algebras of quasitilted type

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The vanishing of self-extensions over n-symmetric algebras of quasitilted type

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