Γi→f=2 πVni^2
̄hρf(E)whereρf(E) is the density of final states. When particles (like photons or electrons) are emitted,
the final state will be a continuum due to the continuum of states available to a free particle. We
will need to carefully compute the density of those states, often known asphase space.
28.3 Examples
28.3.1 Harmonic Oscillator in a Transient E Field
Assume we have an electron in a standard one dimensional harmonic oscillator of frequencyωin its
ground state. An weak electric field is applied for a time intervalT. Calculate the probability to
make a transition to the first (and second) excited state.
The perturbation iseExfor 0< t < Tand zero for other times. We can write this in terms of the
raising an lowering operators.
V=eE√
̄h
2 mω(A+A†)
We now use our time dependent perturbation result to compute thetransition probability to the
first excited state.
cn(t) =1
i ̄h∫t0eiωnit′
Vni(t′)dt′c 1 =1
i ̄heE√
̄h
2 mω∫T
0eiωt′
〈 1 |A+A†| 0 〉dt′=
eE
i ̄h√
̄h
2 mω∫T
0eiωt′
dt′=
eE
i ̄h√
̄h
2 mω[
eiωt′iω]T
0= −eE
̄hω√
̄h
2 mω[
eiωT− 1]
= −
eE
̄hω√
̄h
2 mωeiωT/^2[
eiωT/^2 −e−iωT/^2]
= −
eE
̄hω√
̄h
2 mωeiωT/^22 isin(ωT/2)P 1 =
e^2 E^2
̄h^2 ω^2̄h
2 mω4 sin^2 (ωT/2)P 1 =
2 e^2 E^2
m ̄hω^3sin^2 (ωT/2)