The category of admissible (in the appropriately modified sense of representation theory of totally disconnected groups) semi-linear representations of the automorphism group of an algebraically closed extension of infinite transcendence degree of the field of algebraic complex numbers is described
Let G be a connected reductive linear algebraic group over C and let (ae; V ) be a regular represen...
Matrix representations of finite semigroups over fields are studied not so well as for finite groups...
Abstract. The representation theory of a class of infinite-dimensional groups which are inductive li...
The object of the theory of Group Representation is the study of all homomorphisms of a given group ...
The theory of group representations deals with the classification of homomorphisms of the abstract g...
In this note classes of groups representations of which have either invariant vectors or invariant f...
We obtain a criterion for the restriction of an irreducible rational GL(n)-module to the naturally e...
With every Lie semi-group, Π, possessing certain regularity properties, there is associated a Lie al...
Let F be a field, let G be a finite group, and let π be a linear representation of G over F; that is...
Abstract: Let G be the real points of a connected linear reductive complex algebraic group defined o...
Abstract: Let G be the real points of a connected linear reductive complex algebraic group defined o...
AbstractLet Λ be the cross section lattice of an irreducible representation of a semisimple algebrai...
Abstract: Let G be the real points of a connected linear reductive complex algebraic group defined o...
AbstractThis paper shows that the complex representations of the general linear groupoid over a fixe...
Let G be a semisimple, simply-connected, algebraic group over an algebraically closed field k̄. Let ...
Let G be a connected reductive linear algebraic group over C and let (ae; V ) be a regular represen...
Matrix representations of finite semigroups over fields are studied not so well as for finite groups...
Abstract. The representation theory of a class of infinite-dimensional groups which are inductive li...
The object of the theory of Group Representation is the study of all homomorphisms of a given group ...
The theory of group representations deals with the classification of homomorphisms of the abstract g...
In this note classes of groups representations of which have either invariant vectors or invariant f...
We obtain a criterion for the restriction of an irreducible rational GL(n)-module to the naturally e...
With every Lie semi-group, Π, possessing certain regularity properties, there is associated a Lie al...
Let F be a field, let G be a finite group, and let π be a linear representation of G over F; that is...
Abstract: Let G be the real points of a connected linear reductive complex algebraic group defined o...
Abstract: Let G be the real points of a connected linear reductive complex algebraic group defined o...
AbstractLet Λ be the cross section lattice of an irreducible representation of a semisimple algebrai...
Abstract: Let G be the real points of a connected linear reductive complex algebraic group defined o...
AbstractThis paper shows that the complex representations of the general linear groupoid over a fixe...
Let G be a semisimple, simply-connected, algebraic group over an algebraically closed field k̄. Let ...
Let G be a connected reductive linear algebraic group over C and let (ae; V ) be a regular represen...
Matrix representations of finite semigroups over fields are studied not so well as for finite groups...
Abstract. The representation theory of a class of infinite-dimensional groups which are inductive li...
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