130_notes.dvi

Γ =

∫

dΩ

∣ ∣ ∣ ∣ ∣ ∣

δniǫˆ·ˆǫ′−

1

m ̄h

∑

j

[

〈n|ˆǫ′·~p|j〉〈j|ˆǫ·~p|i〉

ωji−ω

+

〈n|ǫˆ·~p|j〉〈j|ˆǫ′·~p|i〉

ω′+ωji

]

∣ ∣ ∣ ∣ ∣ ∣

2

×

V ω′^2

(2πc)^3

e^4

4 V^2 m^2 ω′ω

2 π

dΓ

dΩ

=

e^4 ω′

(4π)^2 V m^2 c^3 ω

∣ ∣ ∣ ∣ ∣ ∣

δniˆǫ·ˆǫ′−

1

m ̄h

∑

j

[

〈n|ˆǫ′·~p|j〉〈j|ˆǫ·~p|i〉

ωji−ω

+

〈n|ˆǫ·~p|j〉〈j|ǫˆ′·~p|i〉

ω′+ωji

]

∣ ∣ ∣ ∣ ∣ ∣

2

Note that the delta function has enforced energy conservation requiring thatω′=ω−ωni, butwe
have leftω′in the formula for convenience.

The final step to adifferential cross sectionis to divide the transition rate by theincident flux
of particles. This is a surprisingly easy step because we are using plane waves of photons. The
initial state isone particle in the volumeV moving with a velocity ofc, so the flux is simply
c
V.
dσ
dΩ

=

e^4 ω′

(4π)^2 m^2 c^4 ω

∣

∣

∣

∣

∣∣δniˆǫ·ˆǫ

′−^1

m ̄h

∑

j

[

〈n|ˆǫ′·~p|j〉〈j|ˆǫ·~p|i〉

ωji−ω

+

〈n|ǫˆ·~p|j〉〈j|ˆǫ′·~p|i〉

ω′+ωji

]

∣

∣

∣

∣

∣∣

2

Theclassical radius of the electronis defined to ber 0 = e

2
4 πmc^2 in our units. We will factor the
square of this out but leave the answer in terms of fundamental constants.

dσ

dΩ

=

(

e^2

4 πmc^2

) 2 (

ω′

ω

)

∣ ∣ ∣ ∣ ∣ ∣

δniˆǫ·ˆǫ′−

1

m ̄h

∑

j

[

〈n|ˆǫ′·~p|j〉〈j|ˆǫ·~p|i〉

ωji−ω

+

〈n|ˆǫ·~p|j〉〈j|ˆǫ′·~p|i〉

ωji+ω′

]

∣ ∣ ∣ ∣ ∣ ∣

2

This is called theKramers-Heisenberg Formula. Even now, the three (space-time)Feynman
diagramsare visible as separate terms in the formula.

(They show up like

∣

∣

∣

∣

∣

c+

∑

j

(a+b)

∣

∣

∣

∣

∣

2

.) Note that, for the very short time that the system is in an

intermediate state,energy conservation is not strictly enforced. The energy denominators in
the formula suppress larger energy non-conservation. The formula can be applied to several physical
situations as discussed below.