Claire Amiot, Pierre-Guy Plamondon
Published 2017-07-06Version 1
Given a certain triangulation of a punctured surface with boundary, we construct a new triangulated surface without punctures which covers it. This new surface is naturally equipped with an action of a group of order two, and its quotient by this action recovers the original surface. We show that the group acts on the quivers with potentials associated to the surfaces, and that their Ginzburg dg algebras are skew group algebras of each other, up to Morita equivalence. We then use these results to construct functors between the generalized cluster categories associated to the triangulations. This allows us to give a complete description of the indecomposable objects of these categories in terms of curves on the surface, when the surface has punctures and non-empty boundary.
Equivalences between cluster categories
A geometric description of $m$-cluster categories
Cluster categories of type $\mathbb{A}_\infty^\infty$ and triangulations of the infinite strip
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