Quantum excitation is the effect in circular accelerators or storage rings whereby the discreteness of photon emission causes the charged particles (typically electrons) to undergo a random walk or diffusion process.
An electron moving through a magnetic field emits radiation called synchrotron radiation. The expected amount of radiation can be calculated using the classical power. Considering quantum mechanics, however, this radiation is emitted in discrete packets of photons. For this description, the distribution of the number of emitted photons and also the energy spectrum for the electron should be determined instead.
In particular, the normalized power spectrum emitted by a charged particle moving in a bending magnet is given by
| S(\xi)= | 9\sqrt{3 |
This result was originally derived by Dmitri Ivanenko and Arseny Sokolov and independently by Julian Schwinger in 1949.[1]
Dividing each power of this power spectrum by the energy yields the photon flux:
| F(\xi)= | 1 | S(\xi)= |
| \xi |
| 9\sqrt{3 | |
The photon flux from this normalized power spectrum (of all energies) is then
| N |
norm=
| 9\sqrt{3 | |
r\gamma=
| 5\sqrt{3 | |
For a travelled distance
\Deltas
c
\beta ≈ 1
\langlen\gamma\rangle=
| 5\sqrt{3 | |
\alpha
\Deltas
Pr\left(n\gamma=k\right)=
| \langlen\gamma\ranglek | |
| k! |
| -\langlen\gamma\rangle | |
| e |
.
The photon number curve and the power spectrum curve intersect at the critical energy
| u | ||||
|
,
The mean of the quantum energy is given by
\langleu\rangle=
| 8 | |
| 15\sqrt{3 |
\langleu2\rangle
d(s)=
| 55 | |
| 48\sqrt{3 |
| ^3 |
For an early analysis of the effect of quantum excitation on electron beam dynamics in storage rings, see the article by Matt Sands.