Schur roots and tilting modules of acyclic quivers over commutative rings
Abstract
Let Q be a finite acyclic quiver and AQ the cluster algebra of Q. It is well-known that for each field k, the additive equivalence classes of support tilting kQ-modules correspond bijectively with the clusters of AQ. The aim of this paper is to generalize this result to any ring indecomposable commutative Noetherian ring R, that is, the additive equivalence classes of 2-term silting complexes of RQ correspond bijectively with the clusters of AQ. As an application, for a Dynkin quiver Q, we prove that the torsion classes of mod RQ corresponds bijectively with the order preserving maps from Spec R to the set of clusters.
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