On finite dimensional Jacobian Algebras
arXiv:1207.1917
Abstract
We show that Jacobian algebras arising from a sphere with $n$-punctures, with $n\geq5$, are finite dimensional algebras. We consider also a family of cyclically oriented quivers and we prove that, for any primitive potential, the associated Jacobian algebra is finite dimensional.
Improvements in the grammar of the article and change the results of the last section