本文讨论了复(实)数域上的二维李三系的分类及其对应的导子代数的性质。
In this paper, We study the classification and the properties of their derivation algebras of 2-dimensional Lie triple systems over the complex (real) number field.
具体确定了一类中心为二维的三步幂零李代数的导子代数,得到了导子代数的一些性质,并证明了这类幂零李代数是可完备化幂零李代数。
In this paper we explicitly determine the derivation algebras of a class of 3-step nilpotent Lie algebras, and obtain some properties of the derivation algebras.
元微分算子代数的导子李代数结构。
Lie algebras of derivations of n-differential operator algebra.
引进t _导子的概念,刻划了一般代数和算子代数上的T _导子的特征性质。
The concept of generalized T_derivation is introduced and the properties of T_derivations on pure algebra and operator algebras are obtained.
引进t _导子的概念,刻划了一般代数和算子代数上的T _导子的特征性质。
The concept of generalized T_derivation is introduced and the properties of T_derivations on pure algebra and operator algebras are obtained.
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