Tagged mapping class groups: Auslander-Reiten translation
Abstract
We give a geometric realization, the tagged rotation, of the AR-translation on the generalized cluster category associated to a surface S with marked points and non-empty boundary, which generalizes Br\"ustle-Zhang's result for the puncture free case. As an application, we show that the intersection of the shifts in the 3-Calabi-Yau derived category D(S) associated to the surface and the corresponding Seidel-Thomas braid group of D(S) is empty, unless S is a polygon with at most one puncture (i.e. of type A or D).
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