Aslak Bakke Buan, Osamu Iyama, Idun Reiten, David Smith
Published 2008-04-23, updated 2011-04-25Version 4
We prove that mutation of cluster-tilting objects in triangulated 2-Calabi-Yau categories is closely connected with mutation of quivers with potentials. This gives a close connection between 2-CY-tilted algebras and Jacobian algebras associated with quivers with potentials. We show that cluster-tilted algebras are Jacobian and also that they are determined by their quivers. There are similar results when dealing with tilting modules over 3-CY algebras. The nearly Morita equivalence for 2-CY-tilted algebras is shown to hold for the finite length modules over Jacobian algebras.
Comments: 41 pages. In the previous version, there was a mistake in the proof of old Theorem 5.1 asserting compatibility of mutation of QPs and cluster-tilting mutation. In the present version, the proof is fixed by adding assumptions (see new Theorems 5.3 and 5.3), which are satisfied by large classes of examples, in particular those investigated in section 6
Journal: Amer. J. Math. 133 (2011), no. 4, 835--887
A bijection between $m$-cluster-tilting objects and $(m+2)$-angulations in $m$-cluster categories
Mutation of representations and nearly Morita equivalence
On completions of Hecke algebras
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