高斯波包的扩散

Monochromatic wave

单色波的波函数可以写为

$$\begin{align} \psi_k(x, t) = \phi_k(x) e^{-\mathrm{i}Et/\hbar} = \frac{1}{\sqrt{2\pi}}e^{\mathrm{i}\left[kx - \omega(k) t\right]} \end{align}$$

phase velocity $v = \omega/k$ . $\omega(k)$ 为色散关系.

Localized wave packet

一个波包包含不同波长的单色波, 也就是不同的 $k$ 的叠加

$$\begin{align} \psi(x, 0) = \int_{-\infty}^{\infty} \tilde{\psi}(k) \psi_k(x, 0) \mathrm{d}k = \frac{1}{\sqrt{2\pi}} \int_{-\infty}^{\infty} e^{\mathrm{i}kx} \tilde{\psi}(k) \mathrm{d}k \end{align}$$

叠加系数为

$$\begin{align} \tilde{\psi}(k) = \langle \psi_k(x, 0) | \psi(x, 0) \rangle = \frac{1}{\sqrt{2\pi}} \int_{-\infty}^{\infty} e^{-\mathrm{i}kx} \psi(x, 0)\mathrm{d}x \end{align}$$

那么 $t$ 时刻的波函数为

$$\begin{align} \psi(x, t) = \int_{-\infty}^{\infty}\tilde{\psi}(k) \psi_k(x, t) \mathrm{d}k = \frac{1}{\sqrt{2\pi}} \int_{-\infty}^{\infty} e^{\mathrm{i}\left[ kx - \omega(k)t \right]} \tilde{\psi}(k)\mathrm{d}k \end{align}$$

Gaussian wave packet

高斯波包

$$\begin{align} \psi(x, 0) = (\beta\sqrt{\pi})^{-1/2} e^{-\frac{(x - x_0)^2}{2\beta^2}} e^{\mathrm{i}k_0 x} \end{align}$$

取色散关系为 $\omega(k) = \frac{\hbar k^2}{2\mu}$ 可得 (Mathematica 计算过程: [[file:2021-02-28-专业笔记-wave_packet_spreading/draft20210120_Gaussian_wave_packet.nb]] )

$$\begin{align} |\psi(x, t)|^2 = \frac{1}{b(t) \sqrt{\pi}} e^{-\frac{(x - x_0 - v_0t)^2}{b(t)^2}} \end{align}$$

其中

$$\begin{align} b(t) = \beta \sqrt{1 + \frac{\hbar^2t^2}{\mu^2\beta^4}}, \quad v_0 = \frac{\hbar k_0}{\mu} \end{align}$$

可见波包中心按速度 $v_0$ 传播, 宽度越来越宽.

如果 $k$ 集中于 $k_0$ 附近, 那么可以做展开

$$\begin{align} \omega(k) \approx \omega(k_0) + (k - k_0) \left. \frac{\mathrm{d}\omega}{\mathrm{d}k} \right|_{k_0} \end{align}$$

那么

$$\begin{align} \psi(x, t) \approx \frac{e^{-\mathrm{i}\omega_0t}}{\sqrt{2\pi}} \int_{-\infty}^{\infty}\tilde{\psi}(k) e^{\mathrm{i}k(x - v_{\mathrm{g}}t)} \mathrm{d}k \end{align}$$

其中

$$\begin{align} \omega_0 =& \omega(k_0) - k_0 \left. \frac{\mathrm{d}\omega}{\mathrm{d}k} \right|_{k_0}\\ v_{\mathrm{g}} =& \left. \frac{\mathrm{d}\omega}{\mathrm{d}k} \right|_{k_0} \end{align}$$

Reference

Harald Siegfried Friedrich, Theoretical Atomic Physics-Springer (2005) Chap 1.4.1