1) generalized left derivation
广义左导子
1.
Superstability for generalized left derivations and generalized derivations on a unital Banach algebra
含单位元Banach代数的广义左导子与广义导子的超稳定性(英文)
2) Generalized Jordan*-left derivation
广义 Jordan*-左导子
3) generalized derivations
广义导子
1.
For further disscussing the construction, we introduce the generalized derivations of Lie triple systems and obtain the generalized derivations of Lie triple systems form a Lie algebra.
导子代数在刻划李三系的结构中起着重要作用,为深入研究李三系的结构,引入李三系 广义导子的概念,指出广义导子也构成李代数。
2.
The paper introduces the generalized derivations of Lie triple systems by popularizing that of Lie algebras.
将李代数的广义导子的概念推广到李三系中。
3.
For further discussing the construction of n-Lie algebras , we introduce the generalized derivations of n-Lie algebras and show that they respectively form a Liealgebra.
为进 一步讨论n-李代数的结构,引入n-李代数广义导子的概念,指出几种广义导子按2元运算定义的 括积也构成李代数,并得到了这几种广义导子的分解。
4) generalized derivation
广义导子
1.
Superstability for generalized left derivations and generalized derivations on a unital Banach algebra
含单位元Banach代数的广义左导子与广义导子的超稳定性(英文)
2.
Let d_1,d_2,d be derivations andδbe a generalized derivation.
设R是一个特征非2的素环,U是R的一个平方封闭的李理想,d_1,d_2,d是R的导子,δ是R的广义导子。
5) generalized Jordan derivation
广义Jordan导子
1.
It is proved that every generalized Jordan derivation from Tn(R) into M is the sum of a generalized derivation and an antiderivation.
设Tn(R)是一个含单位元的可交换环R上的上三角矩阵代数,引进了广义Jordan导子的概念,并证明了上三角矩阵代数上任意一个广义Jordan导子Δ可分解成一个广义导子ψ和反导子δ之和,即Δ=ψ+δ。
2.
The generalized Jordan derivation was studied by comparing their elements.
用元素比较法研究了三角矩阵代数上的广义Jordan导子,证明了三角矩阵代数上的广义Jordan导子都是一个广义导子。
3.
In this paper, generalized Jordan derivations of triangular algebra are discussed.
主要研究了三角代数上的广义Jordan导子。
6) generalized derivation
广义导算子
1.
In this note,the norm attainability of elementary operators and generalized derivations is established.
本文研究了定义在B(H)上的初等算子和广义导算子的范数可达性,证明了如果定义在B(H)中的初等算子和广义导算子是范数可达的,那么这些算子在B(H)中酉群上的限制也是范数可达的。
补充资料:广义
范围较宽的定义(跟‘狭义’相对):~的杂文也可以包括小品文在内。
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