Quantum
electrodynamics (
QED), a relativistic
quantum field theory of electrodynamics, is among the most
stringently tested theories in
physics.
Precision tests of QED consist of measurements of the
electromagnetic
fine structure
constant, α, in different physical systems. Checking the
consistency of such measurements tests the theory.
Tests of a theory are normally carried out by comparing
experimental results to theoretical predictions. In QED, there is
some subtlety in this comparison, because theoretical predictions
require as input an extremely precise value of α, which can only be
obtained from another precision QED experiment. Because of this,
the comparisons between theory and experiment are usually quoted as
independent determinations of α. QED is then confirmed to the
extent that these measurements of α from different physical sources
agree with each other.
The agreement found this way is to within ten parts in a billion
(10
−8), based on the comparison of the
electron anomalous magnetic dipole
moment and the
Rydberg constant
from atom recoil measurements as described below. This makes QED
one of the most accurate physical theories constructed thus
far.
Precision QED experiments
Precision tests of QED have been performed in low-energy
atomic physics experiments, high-energy
collider experiments, and
condensed matter systems. The value of α is
obtained in each of these experiments by fitting an experimental
measurement to a theoretical expression (including higher-order
radiative corrections) that includes
α as a parameter. The uncertainty in the extracted value of α
includes both experimental and theoretical uncertainties. This
program thus requires both high-precision measurements and
high-precision theoretical calculations. Unless noted otherwise,
all results below are taken from .
Low-energy measurements
Anomalous magnetic dipole moments
The most precise measurement of α comes from the
anomalous magnetic dipole
moment, or
g−2 ("g minus 2"), of the
electron. To make this measurement, two
ingredients are needed:
- 1) A precise measurement of the anomalous magnetic dipole
moment, and
- 2) A precise theoretical calculation of the anomalous magnetic
dipole moment in terms of α.
As of February 2007, the best measurement of the anomalous magnetic
dipole moment of the electron was made by Gabrielse et al. using a
single electron caught in a
Penning
trap. The difference between the electron's cyclotron frequency
and its spin precession frequency in a magnetic field is
proportional to g−2. An extremely high precision measurement of the
quantized energies of the cyclotron orbits, or
Landau levels, of the electron, compared
to the quantized energies of the electron's two possible
spin orientations, gives a value for the
electron's spin
g-factor:
- g/2 = 1.001 159 652 180 85 (76),
a precision of better than one part in a trillion. (The digits in
parentheses indicate the uncertainty in the last listed digits of
the measurement.)
The current state-of-the-art theoretical calculation of the
anomalous magnetic dipole moment of the electron includes QED
diagrams with up to four loops. Combining this with the
experimental measurement of g yields the most precise value of
α:
- α−1 = 137.035 999 070 (98),
a precision of better than a part in a billion. This uncertainty is
ten times smaller than the nearest rival method involving
atom-recoil measurements.
A value of α can also be extracted from the anomalous magnetic
dipole moment of the
muon. The g-factor of the
muon is extracted using the same physical principle as for the
electron above – namely, that the difference between the cyclotron
frequency and the spin precession frequency in a magnetic field is
proportional to g−2.
The most precise measurement comes from
Brookhaven
National Laboratory
's muon g−2 experiment, in which polarized muons are
stored in a cyclotron and their spin orientation is measured by the
direction of their decay electrons. As of February 2007, the
current world average muon g-factor measurement is,
- g/2 = 1.001 165 920 8 (6),
a precision of better than one part in a billion. The difference
between the g-factors of the muon and the electron is due to their
difference in mass. Because of the muon's larger mass,
contributions to the theoretical calculation of its anomalous
magnetic dipole moment from
Standard
Model weak interactions and
from contributions involving
hadrons are
important at the current level of precision, whereas these effects
are not important for the electron. The muon's anomalous magnetic
dipole moment is also sensitive to contributions from new physics
beyond the Standard Model,
such as
supersymmetry. For this
reason, the muon's anomalous magnetic moment is normally used as a
probe for new physics beyond the Standard Model rather than as a
test of QED.K. Hagiwara, A.D. Martin, Daisuke Nomura, and T.
Teubner,
Improved predictions for g−2 of the muon and
αQED(MZ²), Phys.Lett. B649, 173 (2007),
hep-ph/0611102.
Atom-recoil measurements
This is an indirect method of measuring α, based on measurements of
the masses of the electron, certain atoms, and the
Rydberg constant. The Rydberg constant is
known to seven parts in a trillion. The mass of the electron
relative to that of
caesium and
rubidium atoms is also known with extremely high
precision. If the mass of the electron can be gotten with high
enough precision, then α can be found from the Rydberg constant
according to
- R_\infty = \frac{\alpha^2 m_e c}{4 \pi \hbar}.
To get the mass of the electron, this method actually measures the
mass of an
87Rb atom by
measuring the recoil speed of the atom after it emits a photon of
known wavelength in an atomic transition. Combining this with the
ratio of electron to
87Rb atom, the result for α
is,
- α−1 = 137.035 998 78 (91).
Because this measurement is the next-most-precise after the
measurement of α from the electron's anomalous magnetic dipole
moment described above, their comparison provides the most
stringent test of QED, which is passed with flying colors: the
value of α obtained here is within one standard deviation of that
found from the electron's anomalous magnetic dipole moment, an
agreement to within ten parts in a billion.
Neutron Compton wavelength
This method of measuring α is very similar in principle to the
atom-recoil method. In this case, the accurately known mass ratio
of the electron to the
neutron is used. The
neutron mass is measured with high precision through a very precise
measurement of its
Compton
wavelength. This is then combined with the value of the Rydberg
constant to extract α. The result is,
- α−1 = 137.036 010 1 (5 4).
Hyperfine splitting
Hyperfine splitting is a
splitting in the energy levels of an
atom
caused by the interaction between the
magnetic moment of the
nucleus and the combined
spin and orbital magnetic moment of the
electron. The hyperfine splitting in
hydrogen, measured using
Ramsey's hydrogen
maser,
is the most precisely known quantity in physics. Unfortunately, the
influence of the
proton's internal structure
limits how precisely the splitting can be predicted theoretically.
This leads to the extracted value of α being dominated by
theoretical uncertainty:
- α−1 = 137.036 0 (3).
The hyperfine splitting in
muonium, an
"atom" consisting of an electron and an antimuon, provides a more
precise measurement of α because the muon has no internal
structure:
- α−1 = 137.035 994 (18).
Lamb shift
The
Lamb shift is a small difference in
the energies of the 2 S
1/2 and 2 P
1/2
energy levels of hydrogen, which
arises from a one-loop effect in quantum electrodynamics. The Lamb
shift is proportional to α
5 and its measurement yields
the extracted value:
- α−1 = 137.036 8 (7).
Positronium
Positronium is an "atom" consisting of
an electron and a
positron. Whereas the
calculation of the energy levels of ordinary hydrogen is
contaminated by theoretical uncertainties from the proton's
internal structure, the particles that make up positronium have no
internal structure so precise theoretical calculations can be
performed. The measurement of the splitting between the 2
3S
1 and the 1
3S
1
energy levels of positronium yields
- α−1 = 137.034 (16).
Measurements of α can also be extracted from the positronium decay
rate. Positronium decays through the annihilation of the electron
and the positron into two or more
gamma-ray photons. The decay rate of the singlet
("para-positronium")
1S
0 state yields
- α−1 = 137.00 (6),
and the decay rate of the triplet ("ortho-positronium")
3S
1 state yields
- α−1 = 136.971 (6).
This last result is the only serious discrepancy among the numbers
given here, but there is some evidence that uncalculated
higher-order quantum corrections give a large correction to the
value quoted here.
High-energy QED processes
The
cross sections of
higher-order QED reactions at high-energy electron-positron
colliders provide a determination of α. In order to compare the
extracted value of α with the low-energy results, higher-order QED
effects including the running of α due to
vacuum polarization must be taken into
account. These experiments typically achieve only percent-level
accuracy, but their results are consistent with the precise
measurements available at lower energies.
The cross section for e^+e^- \to e^+e^-e^+e^- yields
- α−1 = 136.5 (2.7),
and the cross section fore^+e^- \to e^+e^- \mu ^+\mu ^-
yields
- α−1 = 139.9 (1.2).
Condensed matter systems
The
quantum Hall effect and the
AC Josephson effect are exotic quantum
interference phenomena in condensed matter systems. These two
effects provide a standard
electrical resistance and a standard
frequency, respectively, which are
believed to measure the charge of the electron with corrections
that are strictly zero for macroscopic systems.
The quantum Hall effect yields
- α−1 = 137.035 997 9 (3 2),
and the AC Josephson effect yields
- α−1 = 137.035 977 0 (7 7).
References
- M.E. Peskin and D.V. Schroeder, An Introduction to Quantum
Field Theory (Westview, 1995), p. 198.
- In Search of Alpha, New Scientist, 9 September 2006,
p. 40–43.
- B. Odom, D. Hanneke, B. D'Urso, and G. Gabrielse, New
Measurement of the Electron Magnetic Moment Using a One-Electron
Quantum Cyclotron, Phys. Rev. Lett. 97, 030801 (2006).
- G. Gabrielse, D. Hanneke, T. Kinoshita, M. Nio, and B. Odom,
New Determination of the Fine Structure Constant from the
Electron g Value and QED, Phys. Rev. Lett. 97, 030802 (2006),
Erratum, Phys. Rev. Lett. 99, 039902 (2007).
- Pictorial overview of the Brookhaven muon g−2 experiment,
[1].
- Muon g−2 experiment homepage, [2].
- Pierre Cladé, Estefania de Mirandes, Malo Cadoret, Saïda
Guellati-Khélifa, Catherine Schwob, François Nez, Lucile Julien,
and François Biraben, Determination of the Fine Structure
Constant Based on Bloch Oscillations of Ultracold Atoms in a
Vertical Optical Lattice, Phys. Rev. Lett. 96, 033001
(2006).
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