对于古典与量子系统的机率分布。
Probability distributions for classical and quantum systems.
讨论极端相对论量子系统的能谱问题。
The energy spectral problem of the ultrarelativistic quantum systems is investigated.
简单介绍了量子系统中的超收敛微扰法。
Superconvergent perturbation method in quantum system is briefly introduced.
量子计算机系统实现了两种专门用于量子系统的算法。
The system processed two algorithms written specially for quantum systems.
详细地描述了对具有相互作用的量子系统的物理控制过程。
The physical control procedure of the quantum system with interaction is described in detail.
一个新的几何相因子被定义为任意一个量子系统的循环演化。
A new geometric phase factor is defined for any cyclic evolution of a quantum system.
这是波恩定则的推论,它定义了对一个量子系统的测量产生某种结果的概率。
This is the consequence of Born's rule, which defines the probability that a measurement on a quantum system will yield a certain result.
本文讨论了由线性多变量子系统组成的互联系统的分散补偿控制;
The decentralized compensating control of an interconnected system consisting of several linear multivariable subsystems is investigated.
研究量子系统的量子关联和导致量子关联形成的基本的动力学过程。
This paper studies quantum correlations of quantum systems and the basic dynamics process, which initiates the forming of quantum correlations.
在量子系统中,信道噪声主要源于消相干效应和量子门的不精确性。
In quantum system, noise primary results from decoherence and imperfect quantum gates.
在低维量子系统中,由量子涨落控制的量子相变是值得研究的问题。
In low dimensional system, quantum phase transition controlled by the quantum fluctuation is worth to study.
量子计算最初的目标是使用很少一部分基本元素模拟变化多端的量子系统的行为。
The original goal of quantum computing was to simulate the behavior of arbitrary quantum systems using a small set of basic components.
简单介绍了被动型氢钟的量子系统,阐述了波谱信号观测装置的设计。
The quantum system of the passive hydrogen maser is introduced briefly and a design of the spectrum observing device is expounded.
作为替代的是,量子系统固有的无限可能性在它们自身的宇宙各自显现。
Instead, the myriad different possibilities inherent in a quantum system each manifest in their own universe.
以一维量子阻尼振动系统为例,对该量子系统的量子力学问题进行了讨论。
As a special example, the quantum theories for the one-dimensional quantum damped oscillatory system are discussed.
讨论了纽结理论对量子混沌的应用,并揭示了量子系统中混沌解的拓扑结构。
This paper discusses the application of knot theory to quantum chaos, reveals the topological structure of the chaotic solution of quantum systems.
量子系统通过相互作用在彼此之间产生强有力的影响,因此对设计的规格和性能非常敏感。
Quantum electronic systems are strongly influenced by interactions both within and between nanoparticles, and hence are extremely sensitive to the quality and dimensions of the structure.
本论文报道对一些分段光滑经典系统和其中之一所对应的量子系统特性的研究。
This thesis reports a study on the characteristics of some piecewise-smooth classical systems and the quantum system corresponding to one of them.
第二、四、五章运用量子熵理论研究了量子系统中的熵动力学性质与量子纠缠性质。
In the chapter 2, 4 and 5, the entropic dynamics and the properties of entanglement are investigated in quantum system.
二能级系统是最简单和最基本的量子系统,求解二能级量子系统的问题显得尤为重要。
Problem of two states system is so simple and so element that it is especially important to solving i.
另一方面,量子纠缠又很脆弱,很容易被量子系统和外部环境之间存在的相互作用所破坏。
On the other hand, quantum entanglement is a fragile nature, which can be destroyed by the interaction between the real quantum system and its environment.
在量子光学、凝聚态物理、原子分子物理中存在许多典型的具有三生成元李代数结构的量子系统或模型。
There exist a number of typical systems and models which possess the three generator Lie algebraic structure in quantum optics, atomic and molecular physics and condensed matter physics.
哈密顿量随时间绝热改变的量子系统遵循绝热定理,但系统波函数不具有定态的稳定性质,它们不是定。
A quantal system with Hamiltonian which varies adiabatically with time obeys the adiabatic theorem, but the state of the system is not a stationary state having the stable property.
目前,人们对一具体量子系统的研究主要包括几方面:①量子系统所对应经典哈密顿动力学行为的研究。
Now the studies of chaos in a quantum system include mainly the following several aspects:(1)the study of the dynamic behavior in the Hamitonian which corresponds with a certain quantum system.
一项新的研究表明,无序能在量子系统中增强光和物质的耦合,这个发现最终可能导致高速、易于构建的量子计算机。
A new study shows that disorder can enhance the coupling between light and matter in quantum systems, a find that could eventually lead to fast, easy-to-build quantum computers.
本文在刚性转动与量子系统集体转动特征基础之上,提出了一个计算偶偶变形核基态转动惯量的有效方法。
A effective method of calculating moment of inertia at ground state of even-even deformations nuclei is derived based on rigid rotation and collective rotation nature of quantum systems.
在许多多体量子系统中,随着系统某些外部参数达到它的临界值,在零温情况下量子系统会发生量子相变。
The quantum phase transition (QPT) occurs at zero temperature when the external parameters of some interacting many-body systems change to reach the critical values.
在许多多体量子系统中,随着系统某些外部参数达到它的临界值,在零温情况下量子系统会发生量子相变。
The quantum phase transition (QPT) occurs at zero temperature when the external parameters of some interacting many-body systems change to reach the critical values.
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