Difference between revisions of "Results of Stationary Perturbation Theory"

Review: Results of Stationary Perturbation Theory

For reference, we recapitulate some elementary results from perturbation theory. Assume that the Hamiltonian of a system may be written as the sum of two parts

${\displaystyle H=H_{0}+H^{\prime }}$

and that the eigenstates and eigenvalues of ${\displaystyle H_{0}}$ are known:

${\displaystyle H_{0}|n^{(0)}\rangle =E_{n}^{(0)}|n^{(0)}{\rangle }}$

If it is not possible to find the eigenvalues of ${\displaystyle H}$ exactly, it is possible to write power series expressions for them that converge over some interval. If ${\displaystyle H^{\prime }}$ is time independent, the problem is stationary and the appropriate perturbation theory is Rayleigh- Schrodinger stationary state perturbation theory, described in most texts in quantum mechanics. We write

${\displaystyle E_{n}=E_{n}^{(0)}+E_{n}^{(1)}+E_{n}^{(2)}+\cdots }$

${\displaystyle |n\rangle =|n^{(0)}\rangle +|n^{(1)}\rangle +\cdots }$

and express the ${\displaystyle (i+1)^{\rm {th}}}$ order perturbation in terms of ${\displaystyle E^{(i)}}$ and ${\displaystyle |n^{(i)}{\rangle }}$. The energies are given by

${\displaystyle E_{n}^{(m)}=\langle n^{(0)}|H^{\prime }|n^{(m-1)}{\rangle }}$

We shall only use the lowest two orders here. The first order results are

${\displaystyle E_{n}^{(1)}=\langle n^{(0)}|H^{\prime }|n^{(0)}{\rangle }}$

${\displaystyle |n^{(1)}\rangle =\sum '_{m}{\frac {|m^{(0)}\rangle \langle m^{(0)}|H^{\prime }|n^{(0)}{\rangle }}{E_{n}^{(0)}-E_{m}^{(0)}}}}$

The symbol ${\displaystyle \sum ^{\prime }}$ indicates that the term ${\displaystyle m=n}$ is excluded. It is understood that the sum extends over continuum states. Note that the state function is nor properly normalized, but that the error is quadratic in ${\displaystyle H^{\prime }}$.

The second order results are

${\displaystyle {\begin{array}{rcl}E_{n}^{(2)}&=&\sum '_{n}{\frac {|\langle m^{(0)}|H^{\prime }|n^{(0)}\rangle |^{2}}{E_{n}^{(0)}-E_{m}^{(0)}}}\\|n^{(2)}{\rangle }&=&\sum '_{m}|m\rangle {\left[{\frac {\langle m|H^{\prime }|n{\rangle }}{E_{n}-E_{m}}}{\left[1-{\frac {\langle n|H^{\prime }|n{\rangle }}{E_{n}-E_{m}}}\right]}+\sum '_{p}{\frac {\langle m|H^{\prime }|p\rangle \langle p|H^{\prime }|n{\rangle }}{(E_{n}-E_{m})(E_{n}-E_{p})}}\right]}\end{array}}}$

In second order perturbation theory the effect of a coupling of ${\displaystyle n}$ and ${\displaystyle m}$ by ${\displaystyle H^{\prime }}$ is to push the levels apart, independent of the value of ${\displaystyle H_{nm}^{\prime }}$. Consequently, states coupled by ${\displaystyle H^{\prime }}$ always repel each other.