Add to ORKGAbstract. Wedderburn’s first proof of his theorem on finite division algebras contains a gap. We analyse the gap, give a variant of Wedderburn’s proof that goes completely without the gap-producing statement, and we show how to fill the gap in a way Wedderburn could probably have done it. Content
AbstractWe present an algorithm to compute the Wedderburn decomposition of semisimple group algebras...
Throughout, A denotes a finite dimensional algebra over a field k. We let Rad(A) be the Jacobson (ni...
AbstractThis paper studies separating subsets of an invariant ring or, more generally, of any set co...
Wedderburn's first proof of his theorem on finite division algebras contains a gap. We analyse...
AbstractThe theory of division algebras (of finite dimension over the center) is reduced to an appli...
AbstractThe theory of division algebras (of finite dimension over the center) is reduced to an appli...
Abstract. This paper is concerned with the problem of determining the number of division algebras wh...
A finite algebra of finite type (i.e. in a finite language) is finitely based iff the variety it gen...
A finite algebra of finite type (i.e. in a finite language) is finitely based iff the variety it gen...
notation and terminology for this paper. The following propositions are true: 1. PRELIMINARIES (1) F...
Wedderburn’s theorem on the structure of finite dimensional (semi)simple algebras is proved by using...
AbstractIn this paper we extend a recent result of Liu ([6]) to a larger class of algebras which inc...
We use the Dandelin–Gallucci theorem to give a proof of Wedderburn's little theorem that every finit...
Wedderga 2 The title “Wedderga ” stands for “WEDDERburn decomposition of Group Algebras. This is a G...
Abstract. We present an alternative constructive proof of the Brauer-Witt theorem using the so-calle...
AbstractWe present an algorithm to compute the Wedderburn decomposition of semisimple group algebras...
Throughout, A denotes a finite dimensional algebra over a field k. We let Rad(A) be the Jacobson (ni...
AbstractThis paper studies separating subsets of an invariant ring or, more generally, of any set co...
Wedderburn's first proof of his theorem on finite division algebras contains a gap. We analyse...
AbstractThe theory of division algebras (of finite dimension over the center) is reduced to an appli...
AbstractThe theory of division algebras (of finite dimension over the center) is reduced to an appli...
Abstract. This paper is concerned with the problem of determining the number of division algebras wh...
A finite algebra of finite type (i.e. in a finite language) is finitely based iff the variety it gen...
A finite algebra of finite type (i.e. in a finite language) is finitely based iff the variety it gen...
notation and terminology for this paper. The following propositions are true: 1. PRELIMINARIES (1) F...
Wedderburn’s theorem on the structure of finite dimensional (semi)simple algebras is proved by using...
AbstractIn this paper we extend a recent result of Liu ([6]) to a larger class of algebras which inc...
We use the Dandelin–Gallucci theorem to give a proof of Wedderburn's little theorem that every finit...
Wedderga 2 The title “Wedderga ” stands for “WEDDERburn decomposition of Group Algebras. This is a G...
Abstract. We present an alternative constructive proof of the Brauer-Witt theorem using the so-calle...
AbstractWe present an algorithm to compute the Wedderburn decomposition of semisimple group algebras...
Throughout, A denotes a finite dimensional algebra over a field k. We let Rad(A) be the Jacobson (ni...
AbstractThis paper studies separating subsets of an invariant ring or, more generally, of any set co...