The Minimal Non-Koszul A(Gamma)

Abstract

The algebras A(), where is a directed layered graph, were first constructed by I. Gelfand, S. Serconek, V. Retakh and R. Wilson. These algebras are generalizations of the algebras Qn, which are related to factorizations of non-commutative polynomials. It was conjectured that these algebras were Koszul. In 2008, T.Cassidy and B.Shelton found a counterexample to this claim, a non-Koszul A() corresponding to a graph with 18 edges and 11 vertices. We produce an example of a directed layered graph with 13 edges and 9 vertices which produces a non-Koszul A(). We also show this is the minimal example with this property.