Based on the previous works, the Schrdinger equation of the hydrogen-like atom is analytically solved further.
在以往工作基础上对类氢原子体系的薛定谔方程进行了进一步求解。
Furthermore we discussed the problem of phase transformation for Schrdinger equation and Klein-Gordon equation.
另外,讨论了薛定谔方程、克莱因·戈尔登方程的相位坐标变换问题。
Nonlinear Schrdinger equation in the time domain is often solved, when ultrashort pulses are propagated in fibers.
通常是在时域上求解非线性薛定谔方程来研究光纤中超短光脉冲传输特性。
The propagation of optical beams in nonlocal nonlinear media is modeled by the nonlocal nonlinear Schrdinger equation.
光束在非局域非线性介质中传输由非局域非线性薛定谔方程描述。
Electronic states of three-dimensional quantum ring are studied by solving precisely the time-independent Schrdinger equation.
本文通过较精确地求解能量本征方程获得三维量子环的电子能态。
The Schrdinger equation and Poisson equation are solved self-consistently to calculate the new two dimensional surface states.
从薛定谔方程和泊松方程的自洽计算中得到了新的二维表面态。
The propagation of the optical beam in the nonlocal nonlinear media is governed by the nonlocal nonlinear Schrdinger equation (NNLSE).
光束在非局域非线性介质中传输时遵循非局域非线性薛定谔方程(NNLSE)。
The multipass amplification characters of the chirped pulse in gain medium were studied with the Schrdinger equation and population equation.
利用非线性薛定谔方程和速率方程,研究了啁啾脉冲在增益介质中多程放大的特性。
The nonlinear Schrdinger equation of laser-plasma interaction is used to study the self-compression of femtosecond intense laser pulse in plasma.
文章从激光等离子体相互作用的非线性薛定谔方程出发,理论研究了飞秒强激光脉冲在等离子体中的自压缩行为。
Modulation instability (MI) in single-mode optical fibers is investigated analytically and numerically using a modified nonlinear Schrdinger equation.
基于修正的非线性薛定谔方程,利用线性扰动理论和数值方法研究了单模光纤中的调制不稳定性。
It is discussed the influence of nonlinear frequency chirp to the transmission of 2nd-soliton in optical fibers by solving nonlinear Schrdinger equation.
从非线性薛定谔方程出发,研究了初始非线性频率啁啾对二阶孤子脉冲传输行为的影响。
The steady solution and its stability of Nonlinear Schrdinger Equation (NLSE) are studied by means of traveling wave transformation and bifurcation theory.
用行波变换方法和分叉理论研究里非线性薛定谔方程的定常解和定常解的稳定性。
In 2d polar coordinates, the exact solution to the Schrdinger equation was used to calculate the perturbation integral in a parabolic confinement potential.
受限势采用抛物形势,在二维平面极坐标下,用薛定谔方程的精确解析解进行计算。
The analytical solutions to 1D Schrdinger equation (in depth direction) in double gate (DG) MOSFETs are derived to calculate electron density and threshold voltage.
推导了双栅MOSFET器件在深度方向上薛定谔方程的解析解以求得电子密度和阈电压。
The nonlinear Schrdinger equation leads to a second order nonlinear difference equation, and we obtain transmission spectrum of wave by iterating the difference equation.
把非线性薛定谔方程转化成二阶差分方程,通过迭代此差分方程得到透射谱。
From the nonlinear Schrdinger equation of beam propagating in Kerr absorbing medium, a set of evolution equations describing Gaussian beam waist radius have bean deduced.
由光束在克尔型吸收介质中传输的非线性薛定谔方程出发,推导了高斯光束注入介质后满足的耦合方程。
Stemming from the coupled nonlinear Schrdinger equation, we use the split-step Fourier transforms(SSFT) to study the factors which influence the signal pulse's transmission.
从非线性薛定谔耦合方程出发,利用分步傅立叶的方法得到了脉冲的动力学方程。
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.
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。
In even magnetic field, the degeneracy of two gauges is calculated when magnetic field is confined in a cylindrical domain. The solution method of Schrdinger equation is introduced.
在均匀磁场中,计算两种规范下,磁场被限制在一个柱体的区域的简并度,说明了薛定谔方程的求解方法。
In comparison with the methods by solving Schrdinger equation or using group theory, this method is more simple and convenient, and its physical picture is very visual and explicit.
这种方法与严格求解薛定谔方程或群论方法相比,较为简便,且物理图像直观、明确。
We analyse the common radial and time Schrdinger equation using finite differential approach, get dispersion equations of two kinds of Schrdinger equation by finite differential approach.
对普通的径向薛定谔方程和含时的薛定谔方程进行了有限差分法的分析,给出了两种薛定谔方程的有限差分法的离散方程。
The influences of some relevant parameters on resonance ionization efficiency in the recent laser pulse time-delayed scheme were analyzed with the framework of time-dependent Schrdinger equation.
针对宁西京教授提出激光脉冲延时方案,在含时薛定谔方程理论框架下探讨了各种参数对激光共振电离效率的影响;
The ionization of one dimensional model atoms in ultra intense laser fields has been studied by solving time dependent Schrdinger equation using the least square fitting and the Runge Kutta methods.
利用最小二乘法和龙格库塔方法求解含时薛定谔方程,研究了一维原子模型在超强激光场中的电离。
The coherently coupled nonlinear Schrdinger (NLS) equation of the propagation of a light pulse in a fiber has been studied.
利用光脉冲在光纤中传播时所遵守的相干非线性薛定谔耦合方程,研究了线偏振光在光纤中的传输特性。
Then the Schrdinger-type nonlinear equation in strong nonlocality was given and from the equation the analytical expressions of the single soliton and the critical power .
得到了非线性系数以及特征长度和预倾角的关系,并且给出了强非局域性的非线性薛定谔方程,最终得到了单孤子和临界功率的解析解。
Then the Schrdinger-type nonlinear equation in strong nonlocality was given and from the equation the analytical expressions of the single soliton and the critical power .
得到了非线性系数以及特征长度和预倾角的关系,并且给出了强非局域性的非线性薛定谔方程,最终得到了单孤子和临界功率的解析解。
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