Lie algebras of derivations of n-differential operator algebra.
元微分算子代数的导子李代数结构。
The method of the harmonic oscillator operator algebra has been used to study the two-dimensional polaron in a magnetic field.
谐振子算符的代数运算方法被用于研究磁场中同时与表面光学声子及表面声学声子相互作用的二维电子。
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。
And give general forms of every class of degenerate operator algebras by the representations of this algebra and constructions of symmetric ideals.
并通过算子代数的分解以及对称理想的结构给出各类退化算子代数的一般形式。
As multiple-quantum operator algebra theory mentioned, any unitary transformation can be decomposed into a sequence of a limited number of one-qubit quantum gates and two-qubit diagonal gates.
多量子算符代数理论可以将幺正变换分解为一系列有限的单量子门和对角双量子门的组合。
Methods Using the definition of effect algebra, sequential effect algebra and the polar decomposition of operator.
方法利用效应代数、序列效应代数的定义及算子分解的方法。
The conclusion is that the theoretical foundation of commutative hyper-operator method is Lie algebra.
结论是交换超算符方法的理论基础是李代数。
The conclusion is that the theoretical foundation of commutative hyper-operator method is Lie algebra.
结论是交换超算符方法的理论基础是李代数。
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