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 Schrodinger equation of time - dependent harmonic oscillator is solved by the time space transformation, and its application in physics is presented.
利用时空变换法求解含时谐振子的薛定谔方程,并对这类问题在物理上的应用作了说明。
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 contents of this thesis are the following: 1 the spectra and the wave functions of 2d harmonic oscillator in non-commutative space.
主要内容如下:1、非对易空间(?)中二维谐振子的能谱及波函数的研究。
The contents of this thesis are the following: 1 the spectra and the wave functions of 2d harmonic oscillator in non-commutative space.
主要内容如下:1、非对易空间(?)中二维谐振子的能谱及波函数的研究。
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