利用不变本征算符法给出了坐标-动量耦合的三模耦合量子谐振子的能级信息。
The energy levels for three-dimensional coordinate-momentum coupled quantum harmonic oscillators are presented by using invariant eigen-operator method.
根据对波函数的分析发现,谐振子势是描述量子点的一个较好的势模型。
According to the analysis of wave function, we can find that harmonic potential is a good model to describe quantum dots.
研究了内可逆谐振子量子卡诺制冷机的整体最优性能。
This paper investigates the whole optimum performance of a endoreversible quantum Carnot refrigerator.
用基于普遍形式的不确定关系之上的变分方法推出了一维谐振子的含有量子数的等式型不确定关系。
Based on the general form of the uncertainty relation, using the variation method, the paper here deduces the equality form uncertainty relation which with quantum number of one - dimensional.
讨论均匀磁场中三维各向同性带电谐振子的双波函数描述,得到量子和经典极限条件下的结果。
Double wave function quantum theory is applied to describe the motion of three dimension isotropy charged harmonic oscillator in a uniform magnetic field.
在量子力学中,对谐振子的研究,无论在理论上还是在实践应用中都很重要。
In Quantum Mechanics, the study of harmonic oscillator is very important in theoretic and in practical application.
利用周期轨道理论,我们计算了在不同情况下,一个粒子在二维谐振子势中存在和不存在磁通量时的量子能级密度。
Using the periodic orbit theory, we computed the quantum level density of a particle in the two-dimensional harmonic oscillator potential with and without the magnetic flux line for different cases.
在有限维希尔伯特空间中构造了非简谐振子的广义相干态,并研究了其量子统计特性。
Generalized coherent states of a non harmonic oscillator in a finite dimensional Hilbert space are constructed and some quantum statistical properties are studied.
写出阻尼谐振子的哈密顿函数,对其直接量子化,用分离变量法得出了薛定谔方程的解。
The Schrdinger equation is given directly from the classical Hamiltonian function of a damping harmonic oscillator, and its solution is obtained by the separation of variables.
求出内可逆谐振子量子卡诺制冷机的生态学优化性能,并讨论了制冷机的导热规律。
The ecological optimum performance of a endoreversible quantum Carnot refrigerator is found, and heat transfer law of the refrigerator is discussed.
对介观互感电容耦合电路作双模耦合谐振子处理,将其量子化。
Mesoscopic double resonance mutual inductance and capacitance coupling circuit is quantized by the method of harmonic oscillator quantization.
对介观复杂耦合电路作双模耦合谐振子处理,将其量子化。
Mesoscopic double resonance circuit with complicated coupling is quantized by the method of harmonic oscillator quantization and linear transformation.
本文将复频率谐振子量子化,然后利用类比的方法,实现了二阶电路的量子化。
By the analogical method, the quantization for a second order circuit is realized.
应用多尺度微扰理论,对于弱耦合常数的六次非简谐振子得到了其运动方程的经典和量子情况下的一阶解。
Classical and quantum oscillators of quartic anharmonicity are solved analytically up to the second power of (weak-coupling constant) by using the multiple-scale perturbation theory.
通过变量替换,这种量子化方案也适用于受迫阻尼谐振子。
With some variable correspondences, this quantization scheme is also suitable to a driven da…
通过变量替换,这种量子化方案也适用于受迫阻尼谐振子。
With some variable correspondences, this quantization scheme is also suitable to a driven da…
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