Add to ORKGWe show that the Hilbert polynomial P(t) of the trace space A/[A,A] of the centrally extended preprojective algebra A of an ADE quiver is equal to the Hilbert series of the maximal nilpotent subalgebra of the corresponding simple Lie algebra under the principal gradation. This implies that the Hilbert polynomial of the center of A is t^(2h−4)P(1/t), where h is the Coxeter number
In this abstract $K$ denotes a field of char $K = 0$ and $Q$ denotes a finite acyclic quiver. R...
AbstractWe compute the Hilbert series of some algebras associated to directed graphs and related to ...
AbstractLet Q be a finite quiver with vertex set I and arrow set Q1, k a field, and kQ its path alge...
We show that the Hilbert polynomial P(t) of the trace space A/[A,A] of the centrally extended prepro...
AbstractWe show that the Hilbert polynomial P(t) of the trace space A/[A,A] of the centrally extende...
AbstractWe show that the Hilbert polynomial P(t) of the trace space A/[A,A] of the centrally extende...
Preprojective algebras of quivers were introduced in 1979 by Gelfand and Ponomarev [GP], because for...
Preprojective algebras of quivers were introduced in 1979 by Gelfand and Ponomarev [GP], because for...
We determine the structure of the center and the trace space of the centrally extended prep...
We determine the structure of the center and the trace space of the centrally extended prep...
We introduce a central extension of the preprojective algebra of a finite Dynkin quiver (de...
We introduce a central extension of the preprojective algebra of a finite Dynkin quiver (de...
AbstractWe continue the study of the lower central series and its associated graded components for a...
AbstractThe Hochschild cohomology ring of any associative algebra, together with the Hochschild homo...
In this abstract $K$ denotes a field of char $K = 0$ and $Q$ denotes a finite acyclic quiver. R...
In this abstract $K$ denotes a field of char $K = 0$ and $Q$ denotes a finite acyclic quiver. R...
AbstractWe compute the Hilbert series of some algebras associated to directed graphs and related to ...
AbstractLet Q be a finite quiver with vertex set I and arrow set Q1, k a field, and kQ its path alge...
We show that the Hilbert polynomial P(t) of the trace space A/[A,A] of the centrally extended prepro...
AbstractWe show that the Hilbert polynomial P(t) of the trace space A/[A,A] of the centrally extende...
AbstractWe show that the Hilbert polynomial P(t) of the trace space A/[A,A] of the centrally extende...
Preprojective algebras of quivers were introduced in 1979 by Gelfand and Ponomarev [GP], because for...
Preprojective algebras of quivers were introduced in 1979 by Gelfand and Ponomarev [GP], because for...
We determine the structure of the center and the trace space of the centrally extended prep...
We determine the structure of the center and the trace space of the centrally extended prep...
We introduce a central extension of the preprojective algebra of a finite Dynkin quiver (de...
We introduce a central extension of the preprojective algebra of a finite Dynkin quiver (de...
AbstractWe continue the study of the lower central series and its associated graded components for a...
AbstractThe Hochschild cohomology ring of any associative algebra, together with the Hochschild homo...
In this abstract $K$ denotes a field of char $K = 0$ and $Q$ denotes a finite acyclic quiver. R...
In this abstract $K$ denotes a field of char $K = 0$ and $Q$ denotes a finite acyclic quiver. R...
AbstractWe compute the Hilbert series of some algebras associated to directed graphs and related to ...
AbstractLet Q be a finite quiver with vertex set I and arrow set Q1, k a field, and kQ its path alge...