On Koszul algebras

Blum, Stefan.

January 2001

Essen, University, Diss., 2001.

Koszul-Algebra

A Classification of some Quadratic Algebras

McGilvray, H. C. Jr.

27 August 1998

In this paper, for a select group of quadratic algebras, we investigate restrictions necessary on the generators of the ideal for the resulting algebra to be Koszul. Techniques include the use of Gröbner bases and development of Koszul resolutions. When the quadratic algebra is Koszul, we provide the associated linear resolution of the field. When not Koszul, we describe the maps of the resolution up to the instance of nonlinearity. / Ph. D.

Koszul algebra

quadratic algebra

monomial generators

Centra of Quiver Algebras

Gawell, Elin

January 2014

A partly (anti-)commutative quiver algebra is a quiver algebra bound by an (anti-)commutativity ideal, that is, a quadratic ideal generated by monomials and (anti-)commutativity relations. We give a combinatorial description of the ideals and the associated generator graphs, from which one can quickly determine if the ideal is admissible or not. We describe the center of a partly (anti-)commutative quiveralgebra and state necessary and sufficient conditions for the center to be finitely genteratedas a K-algebra.Examples are provided of partly (anti-)commutative quiver algebras that are Koszul algebras. Necessary and sufficient conditions for finite generation of the Hochschild cohomology ring modulo nilpotent elements for a partly (anti-)commutative Koszul quiver algebra are given.

quiver

algebra

commutativity ideal

anti-commutativity ideal

non-commutative

partly commutative

partly anti-commutative

center

Koszul algebra

finitely generated

graded center

Hochschild cohomology

support variety

associative algebra

Mathematics

Matematik