Quivers with potentials and actions of finite abelian groups

Abstract

Let G be a finite abelian group acting on a path algebra kQ by permuting the vertices and preserving the arrowspans. Let W be a potential on the quiver Q which is fixed by the action. We study the skew group dg algebra Q, WG of the Ginzburg dg algebra of (Q, W). It is known that Q, WG is Morita equivalent to another Ginzburg dg algebra QG, WG, whose quiver QG was constructed by Demonet. In this article we give an explicit construction of the potential WG as a linear combination of cycles in QG, and write the Morita equivalence explicitly. As a corollary, we obtain functors between the cluster categories corresponding to the two quivers with potentials.