An electromagnetic four-potential is a relativistic

vector function A vector-valued function, also referred to as a vector function, is a mathematical function of one or more variables whose range is a set of multidimensional vectors or infinite-dimensional vectors. The input of a vector-valued function could b ...

from which the electromagnetic field can be derived. It combines both an electric scalar potential and a magnetic vector potential into a single

four-vector In special relativity, a four-vector (or 4-vector) is an object with four components, which transform in a specific way under Lorentz transformations. Specifically, a four-vector is an element of a four-dimensional vector space considered as a ...

.Gravitation, J.A. Wheeler, C. Misner, K.S. Thorne, W.H. Freeman & Co, 1973, As measured in a given frame of reference, and for a given

gauge Gauge ( or ) may refer to: Measurement * Gauge (instrument), any of a variety of measuring instruments * Gauge (firearms) * Wire gauge, a measure of the size of a wire ** American wire gauge, a common measure of nonferrous wire diameter, ...

, the first component of the electromagnetic four-potential is conventionally taken to be the electric scalar potential, and the other three components make up the magnetic vector potential. While both the scalar and vector potential depend upon the frame, the electromagnetic four-potential is Lorentz covariant. Like other potentials, many different electromagnetic four-potentials correspond to the same electromagnetic field, depending upon the choice of gauge. This article uses

tensor index notation In mathematics, Ricci calculus constitutes the rules of index notation and manipulation for tensors and tensor fields on a differentiable manifold, with or without a metric tensor or connection. It is also the modern name for what used to be c ...

and the

Minkowski metric In mathematical physics, Minkowski space (or Minkowski spacetime) () is a combination of three-dimensional Euclidean space and time into a four-dimensional manifold where the spacetime interval between any two events is independent of the iner ...

sign convention In physics, a sign convention is a choice of the physical significance of signs (plus or minus) for a set of quantities, in a case where the choice of sign is arbitrary. "Arbitrary" here means that the same physical system can be correctly describ ...

. See also covariance and contravariance of vectors and raising and lowering indices for more details on notation. Formulae are given in SI units and Gaussian-cgs units.

Definition

The electromagnetic four-potential can be defined as: : in which ''ϕ'' is the

electric potential The electric potential (also called the ''electric field potential'', potential drop, the electrostatic potential) is defined as the amount of work energy needed to move a unit of electric charge from a reference point to the specific point in ...

, and A is the magnetic potential (a

vector potential In vector calculus, a vector potential is a vector field whose curl is a given vector field. This is analogous to a ''scalar potential'', which is a scalar field whose gradient is a given vector field. Formally, given a vector field v, a ''vecto ...

). The units of ''A^α'' are V· s· m⁻¹ in SI, and Mx· cm⁻¹ in Gaussian-cgs. The electric and magnetic fields associated with these four-potentials are: : In

special relativity In physics, the special theory of relativity, or special relativity for short, is a scientific theory regarding the relationship between space and time. In Albert Einstein's original treatment, the theory is based on two postulates: # The laws ...

, the electric and magnetic fields transform under Lorentz transformations. This can be written in the form of a

tensor In mathematics, a tensor is an algebraic object that describes a multilinear relationship between sets of algebraic objects related to a vector space. Tensors may map between different objects such as vectors, scalars, and even other tensor ...

- the

electromagnetic tensor In electromagnetism, the electromagnetic tensor or electromagnetic field tensor (sometimes called the field strength tensor, Faraday tensor or Maxwell bivector) is a mathematical object that describes the electromagnetic field in spacetime. T ...

. This is written in terms of the electromagnetic four-potential and the

four-gradient In differential geometry, the four-gradient (or 4-gradient) \boldsymbol is the four-vector analogue of the gradient \vec from vector calculus. In special relativity and in quantum mechanics, the four-gradient is used to define the properties and r ...

as: :

F^ = \partial^A^ - \partial^A^ =
  \begin
      0   & -E_x/c & -E_y/c & -E_z/c \\
    E_x/c &    0   & -B_z   &  B_y   \\
    E_y/c &  B_z   &    0   & -B_x   \\
    E_z/c & -B_y   &  B_x   &  0
  \end

assuming that the signature of the

is (+ − − −). If the said signature is instead (− + + +) then: :

F'\,^ = \partial'\,^A^ - \partial'\,^A^ =
  \begin
      0   &  E_x/c &  E_y/c &  E_z/c \\
   -E_x/c &    0   &  B_z   & -B_y   \\
   -E_y/c & -B_z   &    0   &  B_x   \\
   -E_z/c &  B_y   & -B_x   &  0
  \end

This essentially defines the four-potential in terms of physically observable quantities, as well as reducing to the above definition.

In the Lorenz gauge

Often, the Lorenz gauge condition

\partial_ A^ = 0

in an

inertial frame of reference In classical physics and special relativity, an inertial frame of reference (also called inertial reference frame, inertial frame, inertial space, or Galilean reference frame) is a frame of reference that is not undergoing any acceleration. ...

is employed to simplify

Maxwell's equations Maxwell's equations, or Maxwell–Heaviside equations, are a set of coupled partial differential equations that, together with the Lorentz force law, form the foundation of classical electromagnetism, classical optics, and electric circuits. ...

as: : where ''J^α'' are the components of the

four-current In special and general relativity, the four-current (technically the four-current density) is the four-dimensional analogue of the electric current density. Also known as vector current, it is used in the geometric context of ''four-dimensional spa ...

, and :

\Box = \frac \frac - \nabla^2 = \partial^\alpha \partial_\alpha

is the

d'Alembertian In special relativity, electromagnetism and wave theory, the d'Alembert operator (denoted by a box: \Box), also called the d'Alembertian, wave operator, box operator or sometimes quabla operator (''cf''. nabla symbol) is the Laplace operator of Mi ...

operator. In terms of the scalar and vector potentials, this last equation becomes: : For a given charge and current distribution, and , the solutions to these equations in SI units are: :

\begin
       \phi (\mathbf, t) &= \frac \int \mathrm^3 x^\prime \frac \\
  \mathbf A (\mathbf, t) &= \frac \int \mathrm^3 x^\prime \frac,
\end

where :

t_r = t - \frac

is the retarded time. This is sometimes also expressed with :

\rho\left(\mathbf', t_r\right) = \left rho\left(\mathbf', t\right)\right

where the square brackets are meant to indicate that the time should be evaluated at the retarded time. Of course, since the above equations are simply the solution to an

inhomogeneous Homogeneity and heterogeneity are concepts often used in the sciences and statistics relating to the uniformity of a substance or organism. A material or image that is homogeneous is uniform in composition or character (i.e. color, shape, siz ...

differential equation In mathematics, a differential equation is an equation that relates one or more unknown functions and their derivatives. In applications, the functions generally represent physical quantities, the derivatives represent their rates of change, an ...

, any solution to the homogeneous equation can be added to these to satisfy the

boundary condition In mathematics, in the field of differential equations, a boundary value problem is a differential equation together with a set of additional constraints, called the boundary conditions. A solution to a boundary value problem is a solution to th ...

s. These homogeneous solutions in general represent waves propagating from sources outside the boundary. When the integrals above are evaluated for typical cases, e.g. of an oscillating current (or charge), they are found to give both a magnetic field component varying according to ''r'' (the induction field) and a component decreasing as ''r'' (the radiation field).

Gauge freedom

When flattened to a

one-form In differential geometry, a one-form on a differentiable manifold is a smooth section of the cotangent bundle. Equivalently, a one-form on a manifold M is a smooth mapping of the total space of the tangent bundle of M to \R whose restriction to e ...

, can be decomposed via the Hodge decomposition theorem as the sum of an exact, a coexact, and a harmonic form, :

A = d \alpha + \delta \beta + \gamma

. There is gauge freedom in in that of the three forms in this decomposition, only the coexact form has any effect on the

F = d A

. Exact forms are closed, as are harmonic forms over an appropriate domain, so

d d \alpha = 0

and

d\gamma = 0

, always. So regardless of what

\alpha

and

\gamma

are, we are left with simply :

F = d \delta \beta

References

* * {{cite book , author = Jackson, J D , title=Classical Electrodynamics (3rd) , location =New York , publisher=Wiley , year = 1999 , isbn=0-471-30932-X Theory of relativity Electromagnetism Four-vectors