Self-injective Jacobian algebras from Postnikov diagrams

Abstract

We study a finite-dimensional algebra constructed from a Postnikov diagram D in a disk, obtained from the dimer algebra of Baur-King-Marsh by factoring out the ideal generated by the boundary idempotent. Thus is isomorphic to the stable endomorphism algebra of the cluster tilting module T∈CM(B) introduced by Jensen-King-Su in order to categorify the cluster algebra structure of C[Grk( Cn)]. We show that is self-injective if and only if D has a certain rotational symmetry. In this case, is the Jacobian algebra of a self-injective quiver with potential, which implies that its truncated Jacobian algebras in the sense of Herschend-Iyama are 2-representation finite. We study cuts and mutations of such quivers with potential leading to some new 2-representation finite algebras.