Mutation of τ-exceptional sequences for acyclic quivers over local algebras
Abstract
Let k be an algebraically closed field. Let R be a local commutative finite dimensional k-algebra and let Q be a quiver with no loops or oriented cycles. We show that mutation of τ-exceptional sequences over = Rk kQ RQ in the sense of Buan, Hanson, and Marsh coincides with the classical mutation of exceptional sequences defined by Crawley-Boevey and Ringel. In particular, the braid group acts transitively on the set of complete τ-exceptional sequences in mod .
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