τ-exceptional sequences for representations of quivers over local algebras
Abstract
Let k be an algebraically closed field. Let R be a finite dimensional commutative local k-algebra and let Q be a quiver with no oriented cycles. In this paper, we study (signed) τ-exceptional sequences over the algebra = R kQ, which is isomorphic to RQ. We show there is a bijection between the set of complete (signed) τ-exceptional sequences in mod kQ and the set of complete (signed) τ-exceptional sequences in mod . Moreover, we prove that every τ-perpendicular subcategory of mod is equivalent to the module category of R kQ', for some quiver Q'. As a consequence, we prove that the τ-cluster morphism categories of kQ and are equivalent.
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