这就是我们要讨论的关于薛定谔方程的能量部分。
That's what we're going to cover in terms of the energy portion of the Schrodinger equation.
薛定谔方程是一个线性方程。
那薛定谔方程的解是什么?
薛定谔方程会告诉我们,分子中的能级。
The Schr? Dinger equation will give us the energy levels in molecules.
薛定谔方程会告诉我们,分子中的能级。
The Schr?dinger equation will give us the energy levels in molecules.
相同的方程,薛定谔方程,只不过有不同的限制条件。
This is the same equation, the Schr? Dinger equation, only it has different boundary conditions.
好,这就是我们要讲的,关于薛定谔方程能量的部分。
All right, so that's what we're going to cover in terms of the energy portion of the Schrodinger equation.
在薛定谔方程中,我们现在可以用,极坐标的方式来表示了。
In terms of the Schrodinger equation, we now can write it in terms of our polar coordinates here.
引入复变数哈密顿方程和薛定谔方程可以变换为相同的形式。
Applying complex variables, the usual forms of Hamilton equation and Schrodinger equation can be changed into a same form, etc.
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 Schrdinger equation and Poisson equation are solved self-consistently to calculate the new two dimensional surface states.
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。
The propagation of optical beams in nonlocal nonlinear media is modeled by the nonlocal nonlinear Schrdinger equation.
文中通过求解薛定谔方程得到抛物形量子阱的变换矩阵与透射系数。
The transfer matrix and transmission coefficient through a parabolic quantum well are obtained by solving schrodinger equation .
我们看过原子氢的薛定谔方程,但其实我们能把他用在更复杂的体系。
We saw the Schr?dinger equation for atomic hydrogen, but you can write it for more complex systems.
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。
Based on the previous works, the Schrdinger equation of the hydrogen-like atom is analytically solved further.
本人首先用此方法处理了自散焦非线性薛定谔方程的孤子微扰问题。
I tackle the perturbation problem of the nonlinear Schrodinger equation because of its importance.
电子构型就是,对于锂的薛定谔方程,的单电子近似的,简化形式。
The electronic configuration, all it is is the shorthand notation for that one electron approximation for the Schrodinger equation for lithium.
电子构型就是,对于锂的薛定谔方程,的单电子近似的,简化形式。
The electronic configuration, all it is is the shorthand notation for that one electron approximation for the Schrodinger equation for lithium .
微商非线性薛定谔方程(DNLSE)是有众多物理应用的可积方程。
The derivative nonlinear Schrodinger equation (DNLSE) is an integrable equation of many physical applications.
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。
Furthermore we discussed the problem of phase transformation for Schrdinger equation and Klein-Gordon equation.
而一般具有外加微扰作用力的含时薛定谔方程的求解需要通过李群分解。
The general time-dependent SchrOdinger equation with external perturbance needs to be resolved through Lie group decompositions.
我们将研究下氢原子薛定谔方程的解,特别是电子和核子的结合能,我们将研究这部分。
We're going to be looking at the solutions to the Schrodinger equation for a hydrogen atom, and specifically we'll be looking at the binding energy of the electron to the nucleus.
当我们看一个薛定谔方程的时候,它给出一个稳定的氢原子,这是在经典力学中做不到的。
Also, when we're looking at the Schrodinger equation, it allows us to explain a stable hydrogen atom, which is something that classical mechanics did not allow us to do.
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。
The steady solution and its stability of Nonlinear Schrdinger Equation (NLSE) are studied by means of traveling wave transformation and bifurcation theory.
当我们第一次介绍,薛定谔方程的时候,我说你们,可以,把psi看做是,电子位置的代表。
When we first introduced the Schrodinger equation, what I told you was think of psi as being some representation of what an electron is.
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 multipass amplification characters of the chirped pulse in gain medium were studied with the Schrdinger equation and population equation.
但我说了,我们还有,其它的量子数,当你解,psi的薛定谔方程时,必须要,定义这些量子数。
But, as I said before that, we have some more quantum numbers, when you solve the Schrodinger equation for psi, these quantum numbers have to be defined.
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 Schrodinger equation of time - dependent harmonic oscillator is solved by the time space transformation, and its application in physics is presented.
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.
本文将结合分步傅里叶方法和小信号分析法来求解复杂的非线性薛定谔方程(NLSE)。
This paper will use small signal analysis and split-step Fourier to solve the complex nonlinear Schrodinger equation (NLSE).
从非线性薛定谔方程出发得到了色散缓变光纤中交叉相位调制(XPM)不稳定性的增益谱。
Modulation instability gain spectrum resulted from cross-phase modulation (XPM) in decreasing dispersion fiber (DDF) is presented from nonlinear Schrodinger equation.
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