AbstractThe paper investigates simple multilinear algebras, known as comtrans algebras, that are determined by Lie algebras and by pairs of matrices. The two classes of algebras obtained in this way separate, except for the vector triple product algebra
Let R be a commutative ring with unity, A; B be R-algebras, M be (A; B)-bimodule and N be (B;A)-bimo...
In this paper we classiy real simple Lie algebras with reduced root system, i.e. the algebras wit...
In the Zorn vector matrix algebra the three dimensional vector algebra is replaced by a finite dimen...
summary:The paper studies multilinear algebras, known as comtrans algebras, that are determined by s...
A new class of algebras, the so-called comtrans algebras that have recently arisen from the solution...
AbstractSeveral classical and a few new results are presented in which multilinear algebra has prove...
AbstractA review on semitensor product (STP) of matrices is given. It is a generalization of the con...
We show that varieties of algebras over abstract clones and over the corresponding operads are ratio...
AbstractComtrans algebras are modules over a commutative ring R equipped with two trilinear operatio...
AbstractWe prove that the problems of classifying triples of symmetric or skew-symmetric matrices up...
A Lie algebra is a vector space with a bilinear form [—,—], called the Lie bracket, that satisfies t...
This book explains, as clearly as possible, tensors and such related topics as tensor products of ve...
Abstract. We generalize the concept of Lie triple algebra, introduced as tangent algebra of geodesic...
Linear Associative Algebras focuses on finite dimensional linear associative algebras and the Wedder...
AbstractIn Portugal, Multilinear Algebra has a strong group of researchers that achieved, in the las...
Let R be a commutative ring with unity, A; B be R-algebras, M be (A; B)-bimodule and N be (B;A)-bimo...
In this paper we classiy real simple Lie algebras with reduced root system, i.e. the algebras wit...
In the Zorn vector matrix algebra the three dimensional vector algebra is replaced by a finite dimen...
summary:The paper studies multilinear algebras, known as comtrans algebras, that are determined by s...
A new class of algebras, the so-called comtrans algebras that have recently arisen from the solution...
AbstractSeveral classical and a few new results are presented in which multilinear algebra has prove...
AbstractA review on semitensor product (STP) of matrices is given. It is a generalization of the con...
We show that varieties of algebras over abstract clones and over the corresponding operads are ratio...
AbstractComtrans algebras are modules over a commutative ring R equipped with two trilinear operatio...
AbstractWe prove that the problems of classifying triples of symmetric or skew-symmetric matrices up...
A Lie algebra is a vector space with a bilinear form [—,—], called the Lie bracket, that satisfies t...
This book explains, as clearly as possible, tensors and such related topics as tensor products of ve...
Abstract. We generalize the concept of Lie triple algebra, introduced as tangent algebra of geodesic...
Linear Associative Algebras focuses on finite dimensional linear associative algebras and the Wedder...
AbstractIn Portugal, Multilinear Algebra has a strong group of researchers that achieved, in the las...
Let R be a commutative ring with unity, A; B be R-algebras, M be (A; B)-bimodule and N be (B;A)-bimo...
In this paper we classiy real simple Lie algebras with reduced root system, i.e. the algebras wit...
In the Zorn vector matrix algebra the three dimensional vector algebra is replaced by a finite dimen...