Phy5646/AddAngularMomentumProb

Based on exercise 15.1.1. from Principles of Quantum Mechanics, 2nd ed. by Shankar:

Express ${\displaystyle \ S^{2}}$ as a matrix for two spin-1/2 particles in the direct product basis.

1.) First express ${\displaystyle \ S^{2}}$ in terms of ${\displaystyle \ S_{1}^{2}}$, ${\displaystyle \ S_{2}^{2}}$, ${\displaystyle \ S_{1z}}$, ${\displaystyle \ S_{2z}}$, ${\displaystyle \ S_{1\pm }}$ and ${\displaystyle \ S_{2\pm }}$: ${\displaystyle \ S^{2}=({\vec {S_{1}}}+{\vec {S_{2}}})^{2}=S_{1}^{2}+S_{2}^{2}+2{\vec {S_{1}}}\cdot {\vec {S_{2}}}=S_{1}^{2}+S_{2}^{2}+2(S_{1x}S_{2x}+S_{1y}S_{2y}+S_{1z}S_{2z})=S_{1}^{2}+S_{2}^{2}+2S_{1z}S_{2z}+S_{1+}S_{2-}+S_{1-}S_{2+}}$

2.) Then act with this on direct product state ${\displaystyle \ |m_{1}m_{2}\rangle }$: ${\displaystyle \ S^{2}|m_{1}m_{2}\rangle =(S_{1}^{2}+S_{2}^{2}+2S_{1z}S_{2z}+S_{1+}S_{2-}+S_{1-}S_{2+})|m_{1}m_{2}\rangle }$ ${\displaystyle \ =S_{1}^{2}|m_{1}m_{2}\rangle +S_{2}^{2}|m_{1}m_{2}\rangle +2S_{1z}S_{2z}|m_{1}m_{2}\rangle +S_{1+}S_{2-}|m_{1}m_{2}\rangle +S_{1-}S_{2+}|m_{1}m_{2}\rangle }$

${\displaystyle \ =\hbar ^{2}{\frac {1}{2}}\left({\frac {1}{2}}+1\right)|m_{1}m_{2}\rangle +\hbar ^{2}{\frac {1}{2}}\left({\frac {1}{2}}+1\right)|m_{1}m_{2}\rangle +2\hbar ^{2}m_{1}m_{2}|m_{1}m_{2}\rangle +\hbar ^{2}{\sqrt {{\frac {1}{2}}\left({\frac {1}{2}}+1\right)-m_{1}\left(m_{1}+1\right)}}{\sqrt {{\frac {1}{2}}\left({\frac {1}{2}}+1\right)-m_{2}\left(m_{1}-1\right)}}|m_{1}+1;m_{2}-1\rangle }$ ${\displaystyle \ +\hbar ^{2}{\sqrt {{\frac {1}{2}}\left({\frac {1}{2}}+1\right)-m_{1}\left(m_{1}-1\right)}}{\sqrt {{\frac {1}{2}}\left({\frac {1}{2}}+1\right)-m_{2}\left(m_{1}+1\right)}}|m_{1}-1;m_{2}+1\rangle }$ ${\displaystyle \ \Rightarrow S^{2}|m_{1}m_{2}\rangle =\hbar ^{2}\left(\left({\frac {3}{2}}+2m_{1}m_{2}\right)|m_{1}m_{2}\rangle +{\sqrt {\left({\frac {3}{4}}-m_{1}(m_{1}+1)\right)\left({\frac {3}{4}}-m_{2}(m_{2}-1)\right)}}|m_{1}+1;m_{2}-1\rangle +{\sqrt {\left({\frac {3}{4}}-m_{1}(m_{1}-1)\right)\left({\frac {3}{4}}-m_{2}(m_{2}+1)\right)}}|m_{1}-1;m_{2}+1\rangle \right)}$

3.) Now acting on the left with ${\displaystyle \ \langle m_{1}'m_{2}'|}$:

${\displaystyle \ \langle m_{1}'m_{2}'|S^{2}|m_{1}m_{2}\rangle =\hbar ^{2}\left(\left({\frac {3}{2}}+2m_{1}m_{2}\right)\delta _{m_{1}'m_{1}}\delta _{m_{2}'m_{2}}+{\sqrt {\left({\frac {3}{4}}-m_{1}(m_{1}+1)\right)\left({\frac {3}{4}}-m_{2}(m_{2}-1)\right)}}\delta _{m_{1}'m_{1}+1}\delta _{m_{2}'m_{2}-1}+{\sqrt {\left({\frac {3}{4}}-m_{1}(m_{1}-1)\right)\left({\frac {3}{4}}-m_{2}(m_{2}+1)\right)}}\delta _{m_{1}'m_{1}-1}\delta _{m_{2}'m_{2}+1}\right)}$

${\displaystyle \Rightarrow \langle m_{1}'m_{2}'|S^{2}|m_{1}m_{2}\rangle =\hbar ^{2}\left(\left({\frac {3}{2}}+2m_{1}m_{2}\right)\delta _{m_{1}'m_{1}}\delta _{m_{2}'m_{2}}+{\sqrt {\left({\frac {3}{4}}-m_{1}m_{1}'\right)\left({\frac {3}{4}}-m_{2}m_{2}'\right)}}\left(\delta _{m_{1}'m_{1}+1}\delta _{m_{2}'m_{2}-1}+\delta _{m_{1}'m_{1}-1}\delta _{m_{2}'m_{2}+1}\right)\right)}$

3.) Now plugging in appropriate values of ${\displaystyle \ m_{1},m_{2},m_{1}'}$ and ${\displaystyle \ m_{2}'}$:

${\displaystyle \ \langle 1/2;1/2|S^{2}|1/2;1/2\rangle =\hbar ^{2}\left(\left({\frac {3}{2}}+2\cdot {\frac {1}{2}}\cdot {\frac {1}{2}}\right)+0\right)=2\hbar ^{2}}$

${\displaystyle \ \langle -1/2;-1/2|S^{2}|-1/2;-1/2\rangle =\hbar ^{2}\left(\left({\frac {3}{2}}+2\cdot {\frac {-1}{2}}\cdot {\frac {-1}{2}}\right)+0\right)=2\hbar ^{2}}$

${\displaystyle \langle 1/2;-1/2|S^{2}|1/2;-1/2\rangle =\left(\left({\frac {3}{2}}+2\cdot {\frac {1}{2}}\cdot {\frac {-1}{2}}\right)+0\right)=\hbar ^{2}}$

${\displaystyle \langle -1/2;1/2|S^{2}|-1/2;1/2\rangle =\left(\left({\frac {3}{2}}+2\cdot {\frac {-1}{2}}\cdot {\frac {1}{2}}\right)+0\right)=\hbar ^{2}}$

${\displaystyle \langle -1/2;1/2|S^{2}|1/2;1/2\rangle =\langle 1/2;1/2|S^{2}|-1/2;1/2\rangle =\left(0+0\right)=0}$

${\displaystyle \langle 1/2;-1/2|S^{2}|1/2;1/2\rangle =\langle 1/2;1/2|S^{2}|1/2;-1/2\rangle =\left(0+0\right)=0}$

${\displaystyle \langle -1/2;-1/2|S^{2}|1/2;1/2\rangle =\langle 1/2;1/2|S^{2}|-1/2;-1/2\rangle =\left(0+0\right)=0}$

${\displaystyle \langle -1/2;1/2|S^{2}|1/2;-1/2\rangle =\langle 1/2;-1/2|S^{2}|-1/2;1/2\rangle =\left(0+{\sqrt {\left({\frac {3}{4}}-{\frac {1}{2}}\cdot {\frac {-1}{2}}\right)\left({\frac {3}{4}}-{\frac {-1}{2}}\cdot {\frac {1}{2}}\right)}}\left(0+1\right)\right)=\hbar ^{2}}$

${\displaystyle \langle -1/2;-1/2|S^{2}|-1/2;1/2\rangle =\langle -1/2;1/2|S^{2}|-1/2;-1/2\rangle =\left(0+0\right)=0}$

${\displaystyle \langle -1/2;-1/2|S^{2}|1/2;-1/2\rangle =\langle 1/2;-1/2|S^{2}|-1/2;-1/2\rangle =\left(0+0\right)=0}$

All that must be done now is arranging the matrix elements in matrix form. The ++ state corresponds to the left (top) while the -- state is on the right (bottom):

${\displaystyle S^{2}={\hbar }^{2}{\begin{pmatrix}2&0&0&0\\0&1&1&0\\0&1&1&0\\0&0&0&2\\\end{pmatrix}}}$

We can clearly see that all of the direct product states do not diagonalize ${\displaystyle \ S^{2}}$. A linear combination of the two problem states, +- and +-, should solve the problem however:

${\displaystyle \ S^{2}(\alpha |+-\rangle +\beta |-+\rangle )=\lambda (\alpha |+-\rangle +\beta |-+\rangle )}$

${\displaystyle \ \Rightarrow (S_{1}^{2}+S_{2}^{2}+2S_{1z}S_{2z}+S_{1+}S_{2-}+S_{1-}S_{2+})(\alpha |+-\rangle +\beta |-+\rangle )=\lambda (\alpha |+-\rangle +\beta |-+\rangle )}$

${\displaystyle \ \Rightarrow \hbar ^{2}\alpha \left(\left({\frac {3}{4}}+{\frac {3}{4}}+2\left({\frac {1}{2}}\cdot {\frac {-1}{2}}\right)\right)|+-\rangle +0+|-+\rangle \right)+\hbar ^{2}\beta \left(\left({\frac {3}{4}}+{\frac {3}{4}}+2\left({\frac {-1}{2}}\cdot {\frac {1}{2}}\right)\right)|-+\rangle +|+-\rangle +0\right)=\lambda (\alpha |+-\rangle +\beta |-+\rangle )}$