研究结果表明,相互作用对各个特征量的影响既有共同的规律,又有不同的个性表现,而这些共同的规律与谐振势约束下的系统有着明显的不同。
It is shown that there are common regulations of the effects on each eigenvalue due to the inter-particle interactions, and in addition, there are different individual behaviors.
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.
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.
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。
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.
计算结果表明,对于两对称方势垒夹一个任意形状势阱的位势,也可能存在谐振隧穿现象。
The calculated results show that the resonance tunneling phenomenon for the potential, which has an arbitrary shape well between double symmetric square barriers could also exist.
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。
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。
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.
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