Fomin-Zelevinsky mutation and tilting modules over Calabi-Yau algebras

Abstract

We say that an algebra over a commutative noetherian ring R is Calabi-Yau of dimension d (d-CY) if the shift functor [d] gives a Serre functor on the bounded derived category of the finite length -modules. We show that when R is d-dimensional local Gorenstein the d-CY algebras are exactly the symmetric R-orders of global dimension d. We give a complete description of all tilting modules of projective dimension at most one for 2-CY algebras, and show that they are in bijection with elements of affine Weyl groups, preserving various natural partial orders. We show that there is a close connection between tilting theory for 3-CY algebras and the Fomin-Zelevinsky mutation of quivers (or matrices). We prove a conjecture of Van den Bergh on derived equivalence of non-commutative crepant resolutions.

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