统一立方根上的三元联立和三元列代数

Viktor Abramov
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引用次数: 0

摘要

我们提出了一种新方法,将换元和李代数的概念扩展到具有三元乘法的代数。我们的方法基于第一种和第二种三元关联性。我们提出了一个三元换元器,它是六个(三元素的所有排列)三乘积的线性组合。这个线性组合的系数是统一的立方根。我们为三元换元器找到了一个由于第一或第二类三元关联性而成立的同一性。所发现的同一性的形式由一般仿射组 GA(1,5) 的排列决定。我们将所发现的同一性视为雅可比同一性在三元情况下的类似物。我们将所发现的同一性视为三元情况下的雅可比同一性。我们引入了统一的立方根的三元李代数的概念,并举例说明了利用矩形矩阵和三维矩阵的三元乘法构造的三元李代数。我们指出了具有三发电机的三元李代数的结构常数与旋转群的不可还原表示之间的联系。
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Ternary Associativity and Ternary Lie Algebra at Cube Root of Unity
We propose a new approach to extending the notion of commutator and Lie algebra to algebras with ternary multiplication laws. Our approach is based on ternary associativity of the first and second kind. We propose a ternary commutator, which is a linear combination of six (all permutations of three elements) triple products. The coefficients of this linear combination are the cube roots of unity. We find an identity for the ternary commutator that holds due to ternary associativity of the first or second kind. The form of the found identity is determined by the permutations of the general affine group GA(1,5). We consider the found identity as an analogue of the Jacobi identity in the ternary case. We introduce the concept of a ternary Lie algebra at the cubic root of unity and give examples of such an algebra constructed using ternary multiplications of rectangular and three-dimensional matrices. We point out the connection between the structure constants of a ternary Lie algebra with three generators and an irreducible representation of the rotation group.
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