Sample problem 2: Difference between revisions

Problem- suppose the hamiltonian of a rigid rotator in a magnetic field perpendicular to the axis is of the form(Merzbacher 1970, Problem 17-1)

${\displaystyle H=AL^{2}+BL_{z}+CL_{y}}$

if terms quadratic in the field are neglected. Assuming B, use Pertubation to the lowest nonvanishing order to get approximate energy eigenvalues text'

Solution- we rotate the system in the direction which is in the Z' axis, thus, ${\displaystyle H=AL^{2}+(B^{2}+C^{2})L_{z}^{'}}$ where the angel between Z and Z' can be written we can have The eigen state${\displaystyle \langle l,m^{'}\rangle }$ with eigen value ${\displaystyle E=Al(l+1)\hbar ^{2}+(B^{2}+C^{2})^{1/2}m'\hbar }$and,

Failed to parse (syntax error): {\displaystyle \left | l,m'\rangle}

If${\displaystyle B\gg C}$, ${\displaystyle H=AL^{2}+(B^{2}+C^{2})L_{z}^{'}}$should be considered as none pertubative Hamiltonian, and ${\displaystyle CL_{y}}$ behaves as pertubative term. So the none pertubative eigen value and eigen states areand ${\displaystyle E_{l,m}^{0}=A\hbar ^{2}l(l+1)+Bm\hbar }$ and first order corrections to the eigenstates of a given Hamiltonian is zero because of ${\displaystyle L_{y}}$ so the second order correction will be written in the following form ${\displaystyle E_{n}^{(2)}=A\hbar ^{2}l(l+1)+Bm\hbar +C^{2}\sum _{l',m'\neq l,m}{\frac {\langle l^{'},m^{'}\left|L_{y}\right|l,m\rangle ^{2}}{E_{l,m}^{0}-E_{l',m'}^{0}}}}$

We know that

${\displaystyle L_{y}={\frac {1}{2i}}(L_{+}-L_{-})}$ So,

${\displaystyle E_{n}^{(2)}=A\hbar ^{2}l(l+1)+Bm\hbar +{\frac {C^{2}m\hbar }{2B}}}$

By exact solution for B>>C we will get: ${\displaystyle E=A\hbar ^{2}l(l+1)+Bm'\hbar +{\frac {C^{2}m'\hbar }{2B}}+...}$

For ${\displaystyle m'\rightarrow m}$ the exact solution gives the same energy,