Fine-structure constant

The fine-structure constant or Sommerfeld fine-structure constant, usually denoted $\alpha$ , is the fundamental physical constant characterizing the strength of the electromagnetic interaction. It was originally introduced into physics in 1916 by Arnold Sommerfeld, as a measure of the relativistic deviations in atomic spectral lines from the predictions of the Bohr model.

The fine-structure constant is a dimensionless quantity, thus its numerical value is independent of the system of units used. The value recommended by 2002 CODATA is

\alpha = 7.297 352 568(24) \times 10^{-3} = \frac{1}{137.035 999 11(46)}

It can be defined as

\alpha = \frac{k_C e^2}{\hbar c} = \frac{e^2}{\hbar c 4 \pi \epsilon_0} \ = \frac{e^2}{2 \epsilon_0 h c}

where $k_C$ is the Coulomb constant, $e$ is the elementary charge, $\hbar = h/(2 \pi)$ is the reduced Planck's constant, $c$ is the speed of light in a vacuum, and $\epsilon_0$ is the permittivity of free space.

In electrostatic cgs units, the unit of electric charge (the Statcoulomb or esu of charge) is defined in such a way that the permittivity factor, $4 \pi \epsilon_0$ , is the dimensionless constant 1. Then the fine-structure constant becomes

\alpha = \frac{e^2}{\hbar c}

The fine-structure constant can also be thought of as the square of the ratio of the elementary charge to the Planck charge.

\alpha = \left( \frac{e}{q_P} \right)^2

Physical interpretation

For any arbitrary length

s

, the fine-structure constant is the ratio of two energies: (i) the energy needed to bring two electrons from infinity to a distance of

s

against their electrostatic repulsion, and (ii) the energy of a single photon of wavenumber

k = \frac{2 \pi}{\lambda} = \frac{1}{s}

where

\lambda

is the photon's wavelength.

$\alpha = \frac{k_C e^2}{s} \div \frac{h c}{\lambda} = \frac{k_C e^2}{s} \div \frac{h c}{2 \pi s} = \frac{k_C e^2}{\hbar c}$

Historically, the first physical interpretation of the fine-structure constant, $\alpha$ , was the ratio of the velocity of the electron in the first circular orbit of the Bohr atom to the speed of light in vacuum. It appears naturally in Sommerfeld's analysis and determines the size of the splitting or fine-structure of the hydrogenic spectral lines.

In the theory of quantum electrodynamics, the fine structure constant plays the role of a coupling constant, representing the strength of the interaction between electrons and photons. Its value cannot be predicted by the theory, and has to be inserted based on experimental results. In fact, it is one of the twenty-odd "external parameters" in the Standard Model of particle physics.

The fact that $\alpha$ is much less than 1 allows the use of perturbation theory in quantum electrodynamics. Physical results in this theory are expressed as power series in $\alpha$ , with higher orders of $\alpha$ increasingly unimportant. In contrast, the large value of the corresponding factors in quantum chromodynamics makes calculations involving the strong force extremely difficult.

In the electroweak theory, one that unifies the weak interaction with electromagnetism, the fine-structure constant is absorbed into two other coupling constants associated with the electroweak gauge fields. In this theory, the electromagnetic interaction is treated as a mixture of interactions associated with the electroweak fields.

According to the theory of renormalization group, the value of the fine-structure constant (the strength of the electromagnetic interaction) depends on the energy scale. In fact, it grows logarithmically as the energy is increased. The observed value of $\alpha$ is associated with the energy scale of the electron mass; the energy scale does not run below this because the electron (and the positron) is the lightest charged object whose quantum loops can contribute to the running. Therefore, we can say that 1/137.036 is the value of the fine-structure constant at zero energy. Moreover, as the energy scale increases, the electromagnetic interaction approaches the strength of the other two interactions, which is important for the theories of grand unification. If quantum electrodynamics were an exact theory, the fine-structure constant would actually diverge at an energy known as the Landau pole. This fact makes quantum electrodynamics inconsistent beyond the perturbative expansions.

Is the fine structure constant really constant?

Physicists have been wondering whether the fine structure constant is really a constant, i.e. whether it always had the same value over the history of the universe, as some theories had been suggested which implied this not to be the case. First experimental tests of this question, most notably examination of spectral lines of distant astronomical objects and of the Oklo natural nuclear fission reactor, have not hinted any changes.

Recent improvements in astronomical techniques brought first hints in 2001 that $\alpha$ in fact might change its value over time. (For a brief article see (1) ). However in recent years several experiments have put increasing tighter limits on the variability of $\alpha$ over time. In April 2004, the first set of new and more-detailed observations on quasars made using the UVES spectrograph on Kueyen, one of the 8.2-m telescopes of ESO's Very Large Telescope array at Paranal (Chile), puts limits to any change in $\alpha$ at 0.6 parts per million over the past ten billion years. ESO press release (2) (3)). In April and July 2005, further theoretical (4) and experimental (5) studies have placed even tighter bounds on the variation in the fine structure constant.

Anthropic explanation

One controversial explanation of the value of the fine-structure constant invokes the anthropic principle and argues that the value of the fine-structure is what it is because stable matter and therefore life and intelligent beings could not exist if the value were anything else. For instance, were α to change by 4%, carbon would no longer be produced in stellar fusion. If α were greater than 0.1, fusion would no longer occur in stars.

Numerological explanations

Note: within the scientific community, 'numerology' has a colloquial significance and it is mostly used to refer to any scientific theory that appears to be more mathematical than experimental in its approach.

As a dimensionless constant which does not seem to be directly related to any mathematical constant, the fine-structure constant has long been an object of fascination to physicists. Richard Feynman, one of the founders of quantum electrodynamics, referred to it as "one of the greatest damn mysteries of physics: a magic number that comes to use with no understanding by man." Towards the end of his life, the physicist Arthur Eddington constructed numerological "proofs" that $1 / \alpha$ was an exact integer, even relating it to the Eddington number, his estimate of the number of electrons in the Universe. It has been suggested that this was a spoof or hoax. Experiments have since shown that $1 / \alpha$ is definitely not an integer.

Along similar lines, mathematician James Gilson has suggested that the fine-structure constant, $\alpha$ , can be mathematically determined to be

\alpha =  \frac{\cos \left(\pi/137 \right)}{137} \ \frac{\tan \left(\pi/(137 \cdot 29) \right)}{\pi/(137 \cdot 29)}  \approx 1/137.0359997867

to a very large degree of accuracy. 29 and 137 are respectively the 10^th and 33^rd prime numbers. While this was, before 2002 CODATA, within the standard uncertainty of measurement for $\alpha$ , now it is 1.7 standard uncertainties from the experimental data, which is possible, but a bit improbable.

Physical approaches

Some attempt has also been done to understand the fine-structure constant in a physical way, for instance from thermodynamic considerations. Calculating the annihilation temperature and the decay ratio of 2-gamma and 3-gamma events at the positronium decay by thermodynamics (Thermodynamic consideration of the positronium decay Nuovo Cimento B, Vol 121 Issue 02 Month February pp. 175-191, ISSN 1826-9877 ^*), a result of

\alpha \approx

1/128 was obtained.

Another approach was the calculation of interaction entropy of electrons and photons, with a result of $\alpha \approx$ 1/137.135... (Statistical approach to Sommerfelds fine-structure constant Nuovo Cimento B, Vol. 121, issue no. 3 (2006) pp235-240 ^*).

Following these thermo-statistical approaches, charge could be seen in some kind of conflict: On one hand, it would like to emit a photon, because thus entropy could be generated - but on the other hand, the emission of a photon is "construction expensive" and could tell an observer, where the charge is located. Putting this antagonism into physical formulas, the value of the fine-structure constant could be obtained.

Quote

It has been a mystery ever since it was discovered more than fifty years ago, and all good theoretical physicists put this number up on their wall and worry about it. Richard P. Feynman, QED - The strange theory of light and matter, Princeton University Press 1985, p. 129

External links

http://physics.nist.gov/cuu/Constants/alpha.html
http://scienceworld.wolfram.com/physics/FineStructureConstant.html
Scientific American: Inconstant Constants Barrow and Webb discuss their results in a Scientific American article

References

(4)

(5)

John D. Barrow, 2002. The Constants of Nature: From Alpha to Omega—The Numbers that Encode the Deepest Secrets of the Universe. Pantheon Books. ISBN 0375422218.

Electromagnetism | Fundamental constants | Dimensionless numbers

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