Gauge fixing

From Wikipedia, the free encyclopedia

In the physics of gauge theories, gauge fixing (also called choosing a gauge) denotes a mathematical procedure for coping with redundant degrees of freedom in field variables. By definition, a gauge theory represents each physically distinct configuration of the system as an equivalence class of detailed local field configurations. Any two detailed configurations in the same equivalence class are related by a gauge transformation, equivalent to a shear along unphysical axes in configuration space. Most of the quantitative physical predictions of a gauge theory can only be obtained under a coherent prescription for suppressing or ignoring these unphysical degrees of freedom.

Although the unphysical axes in the space of detailed configurations are a fundamental property of the physical model, there is no special set of directions "perpendicular" to them. Hence there is an enormous amount of freedom involved in taking a "cross section" representing each physical configuration by a particular detailed configuration (or even a weighted distribution of them). Judicious gauge fixing can simplify calculations immensely, but becomes progressively harder as the physical model becomes more realistic; its application to quantum field theory is fraught with complications related to renormalization, especially when the computation is continued to higher orders. Historically, the search for logically consistent and computationally tractable gauge fixing procedures, and efforts to demonstrate their equivalence in the face of a bewildering variety of technical difficulties, has been a major driver of mathematical physics from the late nineteenth century to the present.

1 Gauge freedom
- 1.1 An illustration
2 Coulomb gauge
3 Lorenz gauge
4 Rξ gauges
5 Maximum Abelian gauge
6 Less commonly used gauges
7 References and external links

[edit] Gauge freedom

The archetypical gauge theory is the Heaviside-Gibbs formulation of continuum electrodynamics in terms of an electromagnetic four-potential, which is presented here in space/time asymmetric Heaviside notation. The electric field $\mathbf{E}$ and magnetic flux density $\mathbf{B}$ of Maxwell's equations contain only "physical" degrees of freedom, in the sense that every mathematical degree of freedom in an electromagnetic field configuration has a separately measurable effect on the motions of test charges in the vicinity. These "field strength" variables can be expressed in terms of the scalar potential $\varphi$ and the vector potential $\mathbf{A}$ through the relations:

${\mathbf E} = -\nabla\varphi - \frac{\partial{\mathbf A}}{\partial t}$ and ${\mathbf B} = \nabla\times{\mathbf A}.$

However, the $\mathbf{E}$ and $\mathbf{B}$ fields are unchanged if we take any function $\psi(\mathbf{x},t)$ and transform $\mathbf{A}$ and $\varphi$ via:

$\mathbf{A} \rightarrow \mathbf{A} + \nabla \psi$

$\varphi \rightarrow \varphi - \frac{\partial\psi}{\partial t}$

A particular choice of the scalar and vector potentials is a gauge, and a scalar function $ψ$ used to change the gauge is called a gauge function. The existence of arbitrary numbers of gauge functions $\psi(\mathbf{x},t)$ , corresponds to the U(1) gauge freedom of this theory. Gauge fixing can be done in many ways, some of which we exhibit below.

Although classical electromagnetism is now often spoken of as a gauge theory, it was not originally conceived in these terms. The motion of a classical point charge is affected only by the electric and magnetic field strengths at that point, and the potentials can be treated as a mere mathematical device for simplifying some proofs and calculations. Not until the advent of quantum field theory could it be said that the potentials themselves are part of the physical configuration of a system. The earliest consequence to be accurately predicted and experimentally verified was the Aharonov-Bohm effect, which has no classical counterpart.

Gauge fixing in non-abelian gauge theories, such as Yang-Mills theory and general relativity, is a rather more complicated topic; for details see Gribov ambiguity, Faddeev-Popov ghost, and frame bundle.

[edit] An illustration

Gauge fixing of a twisted cylinder. (Note: the line is on the surface of the cylinder, not inside it.)

By looking at a cylindrical rod can one tell whether it is twisted? If the rod is perfectly cylindrical, then the circular symmetry of the cross section makes it impossible to give an answer. However, if there were a straight line drawn along the length of the rod, then one could easily say whether or not there is a twist by looking at the state of the line. Drawing a line is gauge fixing. Drawing the line spoils the gauge symmetry, ie, the circular symmetry U(1) of the cross section at each point of the rod. The line is the equivalent of a gauge function; it need not be straight. Almost any line is a valid gauge fixing, ie, there is a large gauge freedom. To tell whether the rod is twisted, you need to first know the gauge. Physical quantities, such as the energy of the torsion do not depend on the gauge, ie, they are gauge invariant.

[edit] Coulomb gauge

The Coulomb gauge (also known as transverse or radiation gauge) is given by the constraint

$\nabla\cdot{\mathbf A}=0$

In the Coulomb gauge, it can be seen from Gauss' law that the scalar potential is determined simply by Poisson's equation based on the total charge density ρ (including bound charge):

$-\nabla^2 \phi = \frac{\rho}{\varepsilon_0}$

The solution to this equation is the instantaneous Coulomb potential associated with the charge density, which appears at first glance to violate causality, since motions of electric charge appear everywhere instantaneously as changes to the Coulomb potential. This is generally explained by pointing out that the scalar and vector potentials themselves do not affect the motions of charges, only the combinations of their derivatives that form the electromagnetic field strength. Although one can compute the field strengths explicitly in Coulomb gauge and demonstrate that changes in them propagate at the speed of light, it is much simpler to observe that the field strengths are unchanged under gauge transformations and to demonstrate causality in the manifestly covariant Lorenz gauge described below.

The advantage of the Coulomb gauge is that one can decouple the equations for the scalar and vector potentials, obtaining a wave equation for the vector potential in terms of a quantity called the transverse current which, like the Coulomb potential, drops rapidly to zero outside the immediate vicinity of electric charges. Solutions of this wave equation with the transverse current set to zero correspond classically to transversely polarized electromagnetic radiation in free space. This is particularly useful for "semi-classical" calculations in quantum mechanics, in which the vector potential is quantized but the Coulomb interaction is not.

[edit] Lorenz gauge

The Lorenz gauge is given by the constraint

$\nabla\cdot{\mathbf A} + \frac{1}{c}\frac{\partial\phi}{\partial t}=0$

which may be rewritten in terms of the electromagnetic four-potential:

$\partial^{\mu} A_{\mu} = 0$

It is unique among the constraint gauges in retaining manifest Lorentz invariance. Note, however, that this gauge was originally named after the Danish physicist Ludvig Lorenz and not after Hendrik Lorentz; it is often misspelled "Lorentz gauge". (Neither was the first to use it in calculations; it was introduced in 1888 by George F. Fitzgerald.)

The Lorenz gauge is incomplete in the sense that there remains a subspace of gauge transformations which preserve the constraint. These remaining degrees of freedom correspond to gauge functions which satisfy the wave equation

${ \partial^2 \psi \over \partial t^2 } = c^2 \nabla^2\psi$

These remaining gauge degrees of freedom propagate at the speed of light. To obtain a fully fixed gauge, one must add boundary conditions along the light cone of the experimental region.

Maxwell's equations in the Lorenz gauge simplify to $\partial_\mu \partial^\mu A^\nu = e j^\nu$ , where $j ν$ is the electromagnetic current. Two solutions of these equations for the same current configuration differ by a solution of the vacuum wave equation $\partial_\mu \partial^\mu A^\nu = 0$ . In this form it is clear that the components of the potential separately satisfy the Klein-Gordon equation, and hence that the Lorenz gauge condition allows transversely, longitudinally, and "time-like" polarized waves in the four-potential. The transverse polarizations correspond to classical radiation, i. e., transversely polarized waves in the field strength. To suppress the "unphysical" longitudinal and time-like polarization states, which are not observed in experiments at classical distance scales, one must also employ auxiliary constraints known as Ward identities. Classically, these identities are equivalent to the current conservation constraint $\partial_\mu j^\mu = 0$ .

Many of the differences between classical and quantum electrodynamics can be accounted for by the role that the longitudinal and time-like polarizations play in interactions between charged particles at microscopic distances. This was not well understood at first even by active researchers in the field^[1] and remains inconspicuous in most textbook treatments, partly because a rigorous derivation of the photon propagator requires deeper mathematical tools than one needs for the rest of QED.

[edit] $R ξ$ gauges

The $R ξ$ gauges are a generalization of the Lorenz gauge applicable to theories expressed in terms of an action principle with Lagrangian density $\mathcal{L}$ . Instead of fixing the gauge by constraining the gauge field a priori via an auxiliary equation, one adds to the "physical" (gauge invariant) Lagrangian a gauge breaking term

$\delta \mathcal{L} = -\frac{(\partial_{\mu} A^{\mu})^2}{2 \xi}$

The choice of the parameter $ξ$ determines the choice of gauge. The Landau gauge, obtained as the limit $\xi \rightarrow 0$ , is classically equivalent to Lorenz gauge, but postponing taking the limit until after the theory is quantized improves the rigor of certain existence and equivalence proofs. Most quantum field theory computations are simplest in the Feynman-'t Hooft gauge, in which $ξ = 1$ ; a few are more tractable in other $R ξ$ gauges, such as the Yennie gauge $ξ = 3$ .

An equivalent formulation of $R ξ$ gauge uses an auxiliary field, a scalar field $B$ with no independent dynamics:

$\delta \mathcal{L} = B\,\partial_{\mu} A^{\mu} + \frac{\xi}{2} B^2$

The auxiliary field can be eliminated by "completing the square" to obtain the previous form. From a mathematical perspective the auxiliary field is a variety of Goldstone boson, and its use has advantages when identifying the asymptotic states of the theory, and especially when generalizing beyond QED.

Historically, the use of $R ξ$ gauges was a significant technical advance in extending quantum electrodynamics computations beyond one-loop order. In addition to retaining manifest Lorentz invariance, the $R ξ$ prescription breaks the symmetry under local gauge transformations while preserving the ratio of functional measures of any two physically distinct gauge configurations. This permits a change of variables in which infinitesimal perturbations along "physical" directions in configuration space are entirely uncoupled from those along "unphysical" directions, allowing the latter to be absorbed into the physically meaningless normalization of the functional integral. When $ξ$ is finite, each physical configuration (orbit of the group of gauge transformations) is represented not by a single solution of a constraint equation but by a Gaussian distribution centered on the extremum of the gauge breaking term. In terms of the Feynman rules of the gauge-fixed theory, this appears as a contribution to the photon propagator for internal lines from virtual photons of unphysical polarization.

The photon propagator, which is the multiplicative factor corresponding to an internal photon in the Feynman diagram expansion of a QED calculation, contains a factor $g μν$ corresponding to the Minkowski metric. An expansion of this factor as a sum over photon polarizations involves terms containing all four possible polarizations. Transversely polarized radiation can be expressed mathematically as a sum over either a linearly or circularly polarized basis. Similarly, one can combine the longitudinal and time-like gauge polarizations to obtain "forward" and "backward" polarizations; these are a form of light cone coordinates in which the metric is off-diagonal. An expansion of the $g μν$ factor in terms of circularly polarized (spin +/- 1) and light cone coordinates is called a spin sum. Spin sums can be very helpful both in simplifying expressions and in obtaining a physical understanding of the experimental effects associated with different terms in a theoretical calculation.

Richard Feynman used arguments along approximately these lines largely to justify calculation procedures that produced consistent, finite, high precision results for important observable parameters such as the anomalous magnetic moment of the electron. Although his arguments sometimes lacked mathematical rigor even by physicists' standards and glossed over details such as the derivation of Ward-Takahashi identities of the quantum theory, his calculations worked, and Freeman Dyson soon demonstrated that his method was substantially equivalent to those of Julian Schwinger and Sin-Itiro Tomonaga, with whom Feynman shared the 1965 Nobel Prize in Physics.

Forward and backward polarized radiation can be omitted in the asymptotic states of a quantum field theory (see Ward-Takahashi identity). For this reason, and because their appearance in spin sums can be seen as a mere mathematical device in QED (much like the electromagnetic four-potential in classical electrodynamics), they are often spoken of as "unphysical". But unlike the constraint-based gauge fixing procedures above, the $R ξ$ gauge generalizes well to non-abelian gauge groups such as the SU(3) of QCD. The couplings between physical and unphysical perturbation axes do not entirely disappear under the corresponding change of variables; to obtain correct results, one must account for the non-trivial Jacobian of the embedding of gauge freedom axes within the space of detailed configurations. This leads to the explicit appearance of forward and backward polarized gauge bosons in Feynman diagrams, along with Faddeev-Popov ghosts, which are even more "unphysical" in that they violate the spin-statistics theorem. The relationship between these entities, and the reasons why they do not appear as particles in the quantum mechanical sense, becomes more evident in the BRST formalism of quantization.

Quantum electrodynamics v • d • e
electron \| positron \| photon self-energy \| vacuum polarization \| vertex function Gupta-Bleuler formalism \| ξ gauge \| Ward-Takahashi identity Compton scattering \| Bhabha scattering \| Møller scattering anomalous magnetic dipole moment bremsstrahlung \| positronium

[edit] Maximum Abelian gauge

In any non-Abelian gauge theory, any maximum Abelian gauge is an incomplete gauge which fixes the gauge freedom outside of the maximum Abelian subgroup. Examples are

For SU(2) gauge theory in D dimensions, the maximum Abelian subgroup is a U(1) subgroup. If this is chosen to be the one generated by the Pauli matrix σ₃, then the maximum Abelian gauge is that which maximizes the function

$\int d^Dx \left[(A_\mu^1)^2+(A_\mu^2)^2\right].$ where ${\mathbf A}_\mu = A_\mu^a \sigma_a$

For SU(3) gauge theory in D dimensions, the maximum Abelian subgroup is a U(1)XU(1) subgroup. If this is chosen to be the one generated by the Gell-Mann matrices λ₃ and λ₈, then the maximum Abelian gauge is that which maximizes the function

$\int d^Dx \left[(A_\mu^1)^2+(A_\mu^2)^2+(A_\mu^4)^2+(A_\mu^5)^2+(A_\mu^6)^2+(A_\mu^7)^2\right].$ where ${\mathbf A}_\mu = A_\mu^a \lambda_a$

[edit] Less commonly used gauges

[edit] Weyl gauge

The Weyl gauge (also known as the Hamiltonian or temporal gauge) is an incomplete gauge obtained by the choice

φ = 0

It is named after Hermann Weyl.

[edit] Multipolar gauge

The gauge condition of the Multipolar gauge, Line gauge or Poincaré gauge is:

$\mathbf{x}\cdot\mathbf{A}=0$

where $\mathbf{x}$ is the position vector and $\mathbf{A}$ is the vector potential.

[edit] Fock-Schwinger gauge

The gauge condition of the Fock-Schwinger gauge (sometimes called the relativistic Poincaré gauge) is:

x μ A μ = 0

where $x μ$ is the position four-vector and $A μ$ is the four-potential.

[edit] References and external links

Landau and Lifschitz, "The classical theory of fields"
Jackson, "Classical Electrodynamics"
J. D. Jackson, http://arxiv.org/abs/physics/0204034

Quantum field theory
Field theory • overview of QFT • gauge theory • quantization • renormalization • partition function • vacuum state • anomaly • spontaneous symmetry breaking • condensates Some models: standard model • quantum electrodynamics • quantum chromodynamics Related topics: quantum mechanics • Poincaré symmetry

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Categories: Quantum electrodynamics | Electromagnetism | Quantum field theory

Gauge fixing

From Wikipedia, the free encyclopedia

Contents

[edit] Gauge freedom

[edit] An illustration

[edit] Coulomb gauge

[edit] Lorenz gauge

[edit] $R ξ$ gauges

[edit] Maximum Abelian gauge

[edit] Less commonly used gauges

[edit] Weyl gauge

[edit] Multipolar gauge

[edit] Fock-Schwinger gauge

[edit] References and external links

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Gauge fixing

From Wikipedia, the free encyclopedia

Contents

[edit] Gauge freedom

[edit] An illustration

[edit] Coulomb gauge

[edit] Lorenz gauge

[edit] Rξ gauges

[edit] Maximum Abelian gauge

[edit] Less commonly used gauges

[edit] Weyl gauge

[edit] Multipolar gauge

[edit] Fock-Schwinger gauge

[edit] References and external links

Views

Navigation

interaction

Search

In other languages

[edit] $R ξ$ gauges