Add to ORKGCategorification of real valued sequences, and in particular of integer sequences is a novel line of investigation in the theory of representation of algebras. In this theory introduced by Ringel and Fahr, numbers of a sequence are interpreted as invariants of objects of a given category. The categorification of the Fibonacci numbers via the structure of the Auslander-Reiten quiver of the 3-Kronecker quiver is an example of this kind of identifications. In this thesis, we follow the ideas of Ringel and Fahr to categorify several integer sequences but instead of using the 3-Kronecker quiver, we deal with a kind of algebras introduced recently by Green and Schroll called Brauer configuration algebras. Relationships between these algebras, so...
Abstract This thesis is concerned with various aspects of the representation the- ory of finite dim...
Representation theory is an area of mathematics that deals with abstract algebraic structures and ha...
Las sucesiones excepcionales en el contexto de las álgebras de caminos de un carcaj Q fueron introdu...
Dynkin functions were introduced by Ringel as a tool to investigate combinatorial properties of here...
Ringel CM. Categorification of the Fibonacci numbers using representations of quivers. Journal of In...
Fahr y Ringel presentan una fórmula de partición para los números de Fibonacci de indice par usando ...
This thesis deals with a range of questions in combinatorial aspects of the representation theory of...
Let kK be the path algebra of the Kronecker quiver and consider the category mod-kK of finite dimens...
AbstractUsing a representation theoretical modular approach we present some explicit formulas for th...
Ringel CM. Indecomposable representations of the Kronecker quivers. Proceedings of the American Math...
In this paper, we associate a finite dimensional algebra, called a Brauer graph algebra, to every cl...
We consider the Kronecker algebra = ϑ[, ]/(², ²), where ϑ is a complete discrete valuation ring. Sin...
The module category of an algebra is a major source of study for representation theorists. The indec...
The roots of representation theory go far back into the history of mathematics: the study of symmetr...
The enumeration of Dyck paths is one of the most remarkable problems in Catalan combinatorics. Recen...
Abstract This thesis is concerned with various aspects of the representation the- ory of finite dim...
Representation theory is an area of mathematics that deals with abstract algebraic structures and ha...
Las sucesiones excepcionales en el contexto de las álgebras de caminos de un carcaj Q fueron introdu...
Dynkin functions were introduced by Ringel as a tool to investigate combinatorial properties of here...
Ringel CM. Categorification of the Fibonacci numbers using representations of quivers. Journal of In...
Fahr y Ringel presentan una fórmula de partición para los números de Fibonacci de indice par usando ...
This thesis deals with a range of questions in combinatorial aspects of the representation theory of...
Let kK be the path algebra of the Kronecker quiver and consider the category mod-kK of finite dimens...
AbstractUsing a representation theoretical modular approach we present some explicit formulas for th...
Ringel CM. Indecomposable representations of the Kronecker quivers. Proceedings of the American Math...
In this paper, we associate a finite dimensional algebra, called a Brauer graph algebra, to every cl...
We consider the Kronecker algebra = ϑ[, ]/(², ²), where ϑ is a complete discrete valuation ring. Sin...
The module category of an algebra is a major source of study for representation theorists. The indec...
The roots of representation theory go far back into the history of mathematics: the study of symmetr...
The enumeration of Dyck paths is one of the most remarkable problems in Catalan combinatorics. Recen...
Abstract This thesis is concerned with various aspects of the representation the- ory of finite dim...
Representation theory is an area of mathematics that deals with abstract algebraic structures and ha...
Las sucesiones excepcionales en el contexto de las álgebras de caminos de un carcaj Q fueron introdu...