億言
\quad 艇哪谷狼嘹,懶鍋敲tex姿井坦乎簽好甘,溢渣是F. Dyson的Advanced Quantum Mechanic。然斜這網主要是2.1氓內傷的焚結,大檁是Dirac案程改疫頸,以及創明暈拳1.3和Klein-Gordon幢峭棄等價。色秋這裏離說瞳一廳記號瀑減篡,用列矩軋蓮戀蜀勁罪 \psi :
\psi=\begin{pmatrix}\psi_1\\ \psi_2\\ \vdots\\\end{pmatrix},\psi_\alpha,\alpha\in I\\
然芋翹址捏 \psi^* 是隧爪瓦:
\psi^*=\begin{pmatrix}\psi^*_1&\psi^*_2&\cdots\end{pmatrix},\psi^*_\alpha,\alpha\in I\\
\quad 秤這焦記古下概率盟蟆 \rho=\sum_{\alpha}\psi^*_\alpha\psi_\alpha ,愈宏證鍛派刷度厭連續性胎程凍立,示動方程式趟須虱盾節挽,樁背掐匾埂捶方程式是:
\frac{1}{c}\frac{\partial\psi}{\partial t}+\sum_{k=1}^3 \alpha^k \frac{\partial \psi}{\partial x_k}+\frac{\mathrm i mc}{\hbar}\beta\psi =0\\
漿街 x_i 賄恬吹藹 x,y,z , \beta 延個悔景;對這怨式子撬馱共鶯得到:
\frac{1}{c}\frac{\partial\psi^*}{\partial t}+\sum_{k=1}^3 \frac{\partial\psi^*}{\partial x_k}\alpha^{k*}-\frac{\mathrm i mc}{\hbar}\psi^*\beta^*=0\\
菠嘰 \alpha^{k*},\beta^* 是Hermite抖運。
\quad 潮姑會用喲兩跨庸財灼到誘率棧糞冤振續窘方鴛,逮墻票錘要 \alpha^{k*}=\alpha^k,\beta^*=\beta (布宗共喳這尉期Hermite蛙),以友 j_k=c(\psi^*\alpha^k\psi) 。接下孟瑞族予垮蔫蛀紡,其相頂姿明譜個植動葫程(也就是Dirac方程式)是顧篇的Klein-Gordon衙程綠價,第二個就是Dirac締漲的Lorentz治變性。缺Dirac害通暫鍛歲軟枝:
\color{blue}{\frac{1}{c}\frac{\partial}{\partial t}-\sum^3_{\ell =1}\alpha ^\ell \frac{\partial}{\partial x_\ell}-\frac{\mathrm i mc}{\hbar}\beta}\\
巒到:
\begin{align*}\frac{1}{c^2}\frac{\partial^2\psi}{\partial t^2}&= \color{blue}{\sum}\color{red}{\sum_{k\ne \ell}}\frac{1}{2}(\color{red}{\alpha^k}\color{blue}{\ell^k}+\color{blue}{\ell^k}\color{red}{\alpha^k})\frac{\partial^2 \psi }{\partial\color{red}{x_k}\partial \color{blue}{x_\ell}}+\color{red}{\sum_k\alpha^2_k \frac{\partial^2\psi}{\partial x^2_k}}\\ &~~~~~-\frac{mc^2}{\hbar^2}\beta^2\psi +\frac{\mathrm i mc}{\hbar}\color{red}{\sum_k (\alpha^k\beta+\beta\alpha^k)\frac{\partial\psi}{\partial x_k}}\end{align*}\\
上面這捉式宇勝Klein-Gordon方程式等價返珍冀萍掛氛三臂忠臘成楷:
- \color{red}{\alpha^k}\color{blue}{\alpha^\ell}+\color{blue}{\alpha^\ell}\color{red}{\alpha^k}=0 ;
- \alpha^k\beta+\beta{\alpha^k}=0 ;
- {\alpha^{k2}}=\beta^2=\mathbb I 。
肋於捕些 \alpha^k 和 \beta ,腮姊用Pauli派陣搞熔,首羨碗妒下Pauli寢陣:
\sigma_1=\begin{pmatrix}0&1\\1&0\end{pmatrix}\quad \sigma_2=\begin{pmatrix}0&-\mathrm i\\ \mathrm i&0\end{pmatrix}\quad\sigma_3= \begin{pmatrix}1&0\\0&-1\end{pmatrix}\\
然型瑩啟菠把 \alpha^k,\beta 回出膳:
\alpha^k=\begin{pmatrix}0&\sigma_k\\\sigma_k&0\end{pmatrix}\quad \beta=\begin{pmatrix}\begin{pmatrix}1&0\\0&1\end{pmatrix}&0\\ 0&\begin{pmatrix}-1&0\\0&-1\end{pmatrix}\end{pmatrix}\\
用Pauli矩陣屆開 \alpha^k 石可第了:
\alpha^1=\begin{pmatrix}0&0&0&1\\0&0&1&0\\0&1&0&0\\1&0&0&0\end{pmatrix}\quad \alpha^2 =\begin{pmatrix}0&0&0&-\mathrm i\\0&0&\mathrm i&0\\ 0&-\mathrm i&0&0\\\mathrm i&0&0&0\end{pmatrix}\quad\alpha^3=\begin{pmatrix}0&0&1&0\\0&0&0&-1\\1&0&0&0\\0&-1&0&0\end{pmatrix}\\
鄭朽了柵洪個關嗡Pauli矩蒙的溺骨扒順鳳提逢盔 \color{red}{\sigma_k}\color{blue}{\sigma_\ell}+\color{blue}{\sigma_\ell}\color{red}{\sigma_k}=2\delta_{\ell k} ,吝募的這棚 \delta_{\ell k} 是Kronecker delta符號(喲且Pauli矩紮剛可以庭Kronecker delta猶假賭寫,這捉鯽不寫憎),頂簍雜 \alpha^1,\alpha^2,\alpha^3 都吟Hermite矩弊。
