AbstractWe describe an algorithmic test, using the “standard polynomial identity" (and elementary computational commutative algebra), for determining whether or not a finitely presented associative algebra has an irreducible n -dimensional representation. When n -dimensional irreducible representations do exist, our proposed procedure can (in principle) produce explicit constructions
AbstractLet E be a division ring, and G a finite group of automorphisms of E whose elements are dist...
Let �� be a division ring, and G a finite group of automorphisms of E whose elements are distinct mo...
In this paper we address some algorithmic problems related to computations in finite-dimensional ass...
AbstractWe describe an algorithmic test, using the “standard polynomial identity" (and elementary co...
AbstractLet n be a positive integer, and let R be a finitely presented (but not necessarily finite d...
Let a finite presentation be given for an associative, in general non-commutative algebra E, with id...
Abstract. Let n be a positive integer, and let k be a field (of arbitrary characteristic) accessible...
We construct an infinite family of representations of finite groups with an irreducible adjoint acti...
AbstractLet n be a positive integer, and let k be a field (of arbitrary characteristic) accessible t...
The paper considers computer algebra in a non-commutative setting. So far, suchinvestigations have b...
AbstractLet G be a finite group. It is easy to compute the character of G corresponding to a given c...
Let a finite presentation be given for an associative, in general non-commutative algebra E, with id...
AbstractIn Part I of this paper [G.W. Schwarz, Finite-dimensional representations of invariant diffe...
A representation V of a category D is a functor D --> Mod-R; the representations of D form an abelia...
We present a novel quantitative approach to the representation theory of finite dimensional algebras...
AbstractLet E be a division ring, and G a finite group of automorphisms of E whose elements are dist...
Let �� be a division ring, and G a finite group of automorphisms of E whose elements are distinct mo...
In this paper we address some algorithmic problems related to computations in finite-dimensional ass...
AbstractWe describe an algorithmic test, using the “standard polynomial identity" (and elementary co...
AbstractLet n be a positive integer, and let R be a finitely presented (but not necessarily finite d...
Let a finite presentation be given for an associative, in general non-commutative algebra E, with id...
Abstract. Let n be a positive integer, and let k be a field (of arbitrary characteristic) accessible...
We construct an infinite family of representations of finite groups with an irreducible adjoint acti...
AbstractLet n be a positive integer, and let k be a field (of arbitrary characteristic) accessible t...
The paper considers computer algebra in a non-commutative setting. So far, suchinvestigations have b...
AbstractLet G be a finite group. It is easy to compute the character of G corresponding to a given c...
Let a finite presentation be given for an associative, in general non-commutative algebra E, with id...
AbstractIn Part I of this paper [G.W. Schwarz, Finite-dimensional representations of invariant diffe...
A representation V of a category D is a functor D --> Mod-R; the representations of D form an abelia...
We present a novel quantitative approach to the representation theory of finite dimensional algebras...
AbstractLet E be a division ring, and G a finite group of automorphisms of E whose elements are dist...
Let �� be a division ring, and G a finite group of automorphisms of E whose elements are distinct mo...
In this paper we address some algorithmic problems related to computations in finite-dimensional ass...
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