Skew group algebras of Jacobian algebras

Abstract

For a quiver with potential (Q,W) with an action of a finite cyclic group G, we study the skew group algebra G of the Jacobian algebra = P(Q, W). By a result of Reiten and Riedtmann, the quiver QG of a basic algebra η( G) η Morita equivalent to G is known. Under some assumptions on the action of G, we explicitly construct a potential WG on QG such that η( G) η P(QG , WG). The original quiver with potential can then be recovered by the skew group algebra construction with a natural action of the dual group of G. If is self-injective, then G is as well, and we investigate this case. Motivated by Herschend and Iyama's characterisation of 2-representation finite algebras, we study how cuts on (Q,W) behave with respect to our construction.