The formula of energy levels of two dimensional harmonic oscillator in the uniform magnetic field is derived.
推导出了三维各向同性谐振子在均匀磁场中的能级表达式并讨论了其最低能级及其简并度的变化。
Deducing the uncertainty in energy of one dimensional harmonic oscillator equals zero, and average lifetime equals infinity.
推出一维谐振子的能级的能量不确定范围等于零,能级的平均寿命等于无穷大。
A simple method is used to calculate the phase volumes enclosed by energy surfaces of 2-dimensional harmonic oscillator and rigid diatomic molecule.
用初等方法计算了二维线性谐振子和刚性双原子分子两种情况的能量曲面所包围的相体积。
In terms of SU (1, 1) algebra, the eigen equations of three-dimensional Harmonic Oscillator and hydrogen atom in inverse square potential are counterchanged the same equations in form.
借助于SU(1,1)代数,将三维谐振子与加反平方势的三维氢原子表示成具有相同形式的两算符下的本征值方程。
The method of using node theorem to solve the one-dimensional harmonic oscillator with a deta potential was presented and the reliable accurate eigenenergies and eigen- wave functions were given.
探讨了用节点法求解存在势时的一维谐振子势,并给出精确可靠的能级及本征波函数。
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.
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。
Besides, author derived a correct expression of additional motional constant for the two dimensional isotropic harmonic oscillator.
此外,作者还给出了二维各向同性谐振子的附加运动常数的正确表达式。
Generalized coherent states of a non harmonic oscillator in a finite dimensional Hilbert space are constructed and some quantum statistical properties are studied.
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。
The recurrence formula for radial martrix elements of two-dimensional isotropic harmonic oscillator are derived.
推导出二维各向同性谐振子径向矩阵元所满足的递推公式。
The generalized even and odd coherent states (E-O CSs) of a finite-dimensional space non-harmonic oscillator are constructed, and their nonclassical properties are studied by numerical method.
构造了有限维空间非谐振子广义偶奇相干态,并运用数值计算方法研究了其非经典特性。
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 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。
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