文章从含时薛定谔波动方程出发,结合物理问题中的实际条件,推导出了空间和时间增量必须满足的数值稳定性条件。
Based on Time-dependent Schroe dinger wave equation and physical problems, the stability conditions for the choice of increment parameters are deduced in this paper.
第二,就那个小提琴弦而言,波动方程,被薛定谔所提出的,有许多解法。
The second thing is, just as in the case of the violin string, the wave equation, as posed by Schrodinger, has a plurality of solutions.
结果是薛定谔方程,用描述粒子波动性的方式,来描述这个粒子。
And it turns out that the Schrodinger equation is an equation of motion in which you're describing a particle by describing it as a wave.
The second thing is, just as in the case of the violin string, the wave equation, as posed by Schrodinger, has a plurality of solutions.
第二,就那个小提琴弦而言,波动方程,被薛定谔所提出的,有许多解法。
And it turns out that the Schrodinger equation is an equation of motion in which you're describing a particle by describing it as a wave.
结果是薛定谔方程,用描述粒子波动性的方式,来描述这个粒子。
After that, we'll move on to matter as a wave, and then the Schrodinger equation, which is actually a wave equation that describes the behavior of particles by taking into account the fact that matter also has these wave-like properties.
之后,我们会转移到物质,是一种波的话题和薛定谔方程,薛定谔方程是描述粒子,在考虑物质的波动性质后,的行为的方程。
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