Abstract. The classical result that r-fold vector cross products exist only for d-dimensional vector spaces with r = 1 and d even; r = 2 and d = 3 or 7; r = 3 and d = 8; and r = d − 1 for arbitrary d will be explained. Vector cross products will then be used to construct exceptional Lie superalgebras. 1. Bilinear vector cross products We all are familiar with the usual vector cross product × in R3, which satisfies: u × v is bilinear, u × v ⊥ u, v, (so (u × v) · w is skew symmetric, and so is u × v) (u × v) · (u × v) = ∣ ∣ u·u u·vv·u v·v ∣∣ Definition 1. Let V be a d-dimensional vector space over a field F of characteristic 6 = 2, endowed with a nondegenerate symmetric bilinear form (. |.). A bilinear map × : V × V → V is called a vector ...
In this thesis, we try to indicate a way of obtaining cross product. We use a method of adding condi...
The definition of the vector product is explained with reasons for making such a definition
Let g be a Lie algebra over a field K. Endow the polynomial ring K[t] with a g-action by derivations...
In textbooks and historical literature, the cross product has been defined only in 2-dimensional and...
The cross product of vectors is a fundamental notion in the vector analysis and the applications of ...
The cross product of vectors is a fundamental notion in the vector analysis and the applications of ...
Vectors, cross product, dot productThis Demonstration computes and displays the cross product w = uX...
We introduce the notion of a bicocycle double cross product (sum) Lie group (algebra), and a bicocyc...
AbstractThe subject of this article is bialgebra factorizations or cross product bialgebras without ...
We give an exposition of two fundamental results of the theory of crossed products. One of these sta...
A Lie algebra is a vector space with a bilinear form [—,—], called the Lie bracket, that satisfies t...
Through a matrix approach of the 2-fold vector cross product in R^3 and in R^7, some vector cross pr...
AbstractLet g be a Lie algebra over a field K. Endow the polynomial ring K[t] with a g-action by der...
AbstractLet V be a finite-dimensional vector space over a commutative field of characteristic distin...
the dot product on Rn to a bilinear form on a vector space and study algebraic and geo-metric notion...
In this thesis, we try to indicate a way of obtaining cross product. We use a method of adding condi...
The definition of the vector product is explained with reasons for making such a definition
Let g be a Lie algebra over a field K. Endow the polynomial ring K[t] with a g-action by derivations...
In textbooks and historical literature, the cross product has been defined only in 2-dimensional and...
The cross product of vectors is a fundamental notion in the vector analysis and the applications of ...
The cross product of vectors is a fundamental notion in the vector analysis and the applications of ...
Vectors, cross product, dot productThis Demonstration computes and displays the cross product w = uX...
We introduce the notion of a bicocycle double cross product (sum) Lie group (algebra), and a bicocyc...
AbstractThe subject of this article is bialgebra factorizations or cross product bialgebras without ...
We give an exposition of two fundamental results of the theory of crossed products. One of these sta...
A Lie algebra is a vector space with a bilinear form [—,—], called the Lie bracket, that satisfies t...
Through a matrix approach of the 2-fold vector cross product in R^3 and in R^7, some vector cross pr...
AbstractLet g be a Lie algebra over a field K. Endow the polynomial ring K[t] with a g-action by der...
AbstractLet V be a finite-dimensional vector space over a commutative field of characteristic distin...
the dot product on Rn to a bilinear form on a vector space and study algebraic and geo-metric notion...
In this thesis, we try to indicate a way of obtaining cross product. We use a method of adding condi...
The definition of the vector product is explained with reasons for making such a definition
Let g be a Lie algebra over a field K. Endow the polynomial ring K[t] with a g-action by derivations...