Add to ORKGThis work is an investigation into the structure and properties of Lie hypermatrix algebra generated by a semisimple basis. By using new algebraic tools; namely cubic hypermatrices I obtain an algebraic structure associated with the basis of a semisimple Lie algebra, and I show that the semisimple Lie basis is a generator of infinite periodic semisimple hypermatrix structures, that has a classical Lie algebra decomposition (Bourbaki, 1980; Humphreys, 1972; Serre, 1987); specifically a set of Lie algebras composed of hypermatrices. The generators of higher dimensional semisimple Lie algebra are shown to be special supersymmetric, anti-symmetric and certain skew-symmetric hypermatrices
In Winter [7], a certain class of Lie algebras, s~*mmrtric Lie a&bras, and a corresponding class...
This book deals with central simple Lie algebras over arbitrary fields of characteristic zero. It ai...
We describe in this article relations between innite dimensional Lie algebras and automorphic forms....
This work is an investigation into the structure and properties of supersymmetric hypermatrix Lie al...
AbstractWe consider the following problem: what is the most general Lie algebra or superalgebra sati...
AbstractFirst we briefly describe two previously published algorithms: one that constructs a Cartan ...
First we briefly describe two previously published algorithms: one that constructs a Cartan subalgeb...
AbstractThis paper is concerned with the description of exceptional simple Lie algebras as octonioni...
Starting from the standard supersymmetry algebra, an infinite Lie algebra is constructed by introduc...
We construct Lie algebras of vector fields on universal bundles of symmetric squares of hyperellipti...
Finite dimensional simple and semi-simple Lie algebras will be categorized with the help of Hasse di...
AbstractAlgorithms are described that help with obtaining a classification of the semisimple subalge...
First, we develop a result using multilinear algebra to prove, in an elementary way, a useful identi...
In Kantor and Trishin (1997) [3], Kantor and Trishin described the algebra of polynomial invariants ...
Suppose g to be a complex semisimple Lie algebra. In 1955, Chevalley showed that one can assign to i...
In Winter [7], a certain class of Lie algebras, s~*mmrtric Lie a&bras, and a corresponding class...
This book deals with central simple Lie algebras over arbitrary fields of characteristic zero. It ai...
We describe in this article relations between innite dimensional Lie algebras and automorphic forms....
This work is an investigation into the structure and properties of supersymmetric hypermatrix Lie al...
AbstractWe consider the following problem: what is the most general Lie algebra or superalgebra sati...
AbstractFirst we briefly describe two previously published algorithms: one that constructs a Cartan ...
First we briefly describe two previously published algorithms: one that constructs a Cartan subalgeb...
AbstractThis paper is concerned with the description of exceptional simple Lie algebras as octonioni...
Starting from the standard supersymmetry algebra, an infinite Lie algebra is constructed by introduc...
We construct Lie algebras of vector fields on universal bundles of symmetric squares of hyperellipti...
Finite dimensional simple and semi-simple Lie algebras will be categorized with the help of Hasse di...
AbstractAlgorithms are described that help with obtaining a classification of the semisimple subalge...
First, we develop a result using multilinear algebra to prove, in an elementary way, a useful identi...
In Kantor and Trishin (1997) [3], Kantor and Trishin described the algebra of polynomial invariants ...
Suppose g to be a complex semisimple Lie algebra. In 1955, Chevalley showed that one can assign to i...
In Winter [7], a certain class of Lie algebras, s~*mmrtric Lie a&bras, and a corresponding class...
This book deals with central simple Lie algebras over arbitrary fields of characteristic zero. It ai...
We describe in this article relations between innite dimensional Lie algebras and automorphic forms....