AbstractA unitary (Euclidean) representation of a quiver is given by assigning to each vertex a unitary (Euclidean) vector space and to each arrow a linear mapping of the corresponding vector spaces. We recall an algorithm for reducing the matrices of a unitary representation to canonical form, give a certain description of the representations of canonical form, and reduce the problem of classifying Euclidean representations to the problem of classifying unitary representations. We also describe the set of dimensions of all indecomposable unitary (Euclidean) representations of a quiver and establish the number of parameters in an indecomposable unitary representation of a given dimension
AbstractFor a given quiver and dimension vector, Kac has shown that there is exactly one indecomposa...
Consider the quiver ~D_n and its finite dimensional representations over the field k. We know due to...
AbstractWe define a functor which gives the “global rank of a quiver representation” and prove that ...
AbstractA unitary (Euclidean) representation of a quiver is given by assigning to each vertex a unit...
This book is intended to serve as a textbook for a course in Representation Theory of Algebras at th...
Kac introduced the notion of the canonical decomposition for a dimension vector of a quiver. Here we...
ABSTRACT. A method is proposed that allows the reduction of many classification problems of linear a...
AbstractThe direct sum and tensor product (defined point-wise and arrow-wise) of representations of ...
AbstractIn this paper we classify all the symmetric quivers and corresponding dimension vectors havi...
Techniques from the theory of matrix problems have proven to be helpful for studying problems within...
AbstractIn this paper we classify all quivers and corresponding dimension vectors having a smooth sp...
AbstractThe representation of dimension vector α of the quiver Q can be parametrised by a vector spa...
AbstractVia the computation of cokernels and using the theorem of Krull, Remak and Schmidt to decomp...
Given a presentation of a finitely presented group, there is a natural way to represent the group a...
This carefully written textbook provides an accessible introduction to the representation theory of ...
AbstractFor a given quiver and dimension vector, Kac has shown that there is exactly one indecomposa...
Consider the quiver ~D_n and its finite dimensional representations over the field k. We know due to...
AbstractWe define a functor which gives the “global rank of a quiver representation” and prove that ...
AbstractA unitary (Euclidean) representation of a quiver is given by assigning to each vertex a unit...
This book is intended to serve as a textbook for a course in Representation Theory of Algebras at th...
Kac introduced the notion of the canonical decomposition for a dimension vector of a quiver. Here we...
ABSTRACT. A method is proposed that allows the reduction of many classification problems of linear a...
AbstractThe direct sum and tensor product (defined point-wise and arrow-wise) of representations of ...
AbstractIn this paper we classify all the symmetric quivers and corresponding dimension vectors havi...
Techniques from the theory of matrix problems have proven to be helpful for studying problems within...
AbstractIn this paper we classify all quivers and corresponding dimension vectors having a smooth sp...
AbstractThe representation of dimension vector α of the quiver Q can be parametrised by a vector spa...
AbstractVia the computation of cokernels and using the theorem of Krull, Remak and Schmidt to decomp...
Given a presentation of a finitely presented group, there is a natural way to represent the group a...
This carefully written textbook provides an accessible introduction to the representation theory of ...
AbstractFor a given quiver and dimension vector, Kac has shown that there is exactly one indecomposa...
Consider the quiver ~D_n and its finite dimensional representations over the field k. We know due to...
AbstractWe define a functor which gives the “global rank of a quiver representation” and prove that ...