Jefimenko's equations explained

In electromagnetism, Jefimenko's equations (named after Oleg D. Jefimenko) give the electric field and magnetic field due to a distribution of electric charges and electric current in space, that takes into account the propagation delay (retarded time) of the fields due to the finite speed of light and relativistic effects. Therefore, they can be used for moving charges and currents. They are the particular solutions to Maxwell's equations for any arbitrary distribution of charges and currents.[1]

Equations

Electric and magnetic fields

Jefimenko's equations give the electric field E and magnetic field B produced by an arbitrary charge or current distribution, of charge density ρ and current density J:[2]

\mathbf(\mathbf, t) = \frac \int \left[\frac{\mathbf{r}-\mathbf{r}'}{|\mathbf{r}-\mathbf{r}'|^3}\rho(\mathbf{r}', t_r) + \frac{\mathbf{r}-\mathbf{r}'}{|\mathbf{r}-\mathbf{r}'|^2}\frac{1}{c}\frac{\partial \rho(\mathbf{r}', t_r)}{\partial t} - \frac{1}{|\mathbf{r}-\mathbf{r}'|}\frac{1}{c^2}\frac{\partial \mathbf{J}(\mathbf{r}', t_r)}{\partial t} \right] dV',\mathbf(\mathbf, t) = -\frac \int \left[\frac{\mathbf{r}-\mathbf{r}'}{|\mathbf{r}-\mathbf{r}'|^3} \times \mathbf{J}(\mathbf{r}', t_r) + \frac{\mathbf{r}-\mathbf{r}'}{|\mathbf{r}-\mathbf{r}'|^2} \times \frac{1}{c} \frac{\partial \mathbf{J}(\mathbf{r}', t_r)}{\partial t} \right] dV',

where r′ is a point in the charge distribution, r is a point in space, andt_r = t - \frac

is the retarded time. There are similar expressions for D and H.[3]

These equations are the time-dependent generalization of Coulomb's law and the Biot–Savart law to electrodynamics, which were originally true only for electrostatic and magnetostatic fields, and steady currents.

Origin from retarded potentials

Jefimenko's equations can be found from the retarded potentials φ and A:\begin& \varphi(\mathbf,t) = \dfrac \int \dfrac

dV',\\& \mathbf(\mathbf,t) = \dfrac \int \dfrac
dV',\endwhich are the solutions to Maxwell's equations in the potential formulation, then substituting in the definitions of the electromagnetic potentials themselves: \mathbf = -\nabla\varphi - \dfrac\,, \quad \mathbf = \nabla \times \mathbf and using the relationc^2 = \frac replaces the potentials φ and A by the fields E and B.

Heaviside–Feynman formula

The Heaviside–Feynman formula, also known as the Jefimenko–Feynman formula, can be seen as the point-like electric charge version of Jefimenko's equations. Actually, it can be (non trivially) deduced from them using Dirac functions, or using the Liénard-Wiechert potentials.[4] It is mostly known from The Feynman Lectures on Physics, where it was used to introduce and describe the origin of electromagnetic radiation.[5] The formula provides a natural generalization of the Coulomb's law for cases where the source charge is moving: \mathbf = \frac \left[\frac{\mathbf{e}_{r'}}{r'^2} + \frac{r'}{c} \frac{d}{dt} \left(\frac{\mathbf{e}_{r'}}{r'^2}\right) +\frac{1}{c^2} \frac{d^2}{dt^2} \mathbf{e}_{r'} \right] \mathbf = - \mathbf_ \times \frac Here,

E

and

B

are the electric and magnetic fields respectively,

q

is the electric charge,

\varepsilon0

is the vacuum permittivity (electric field constant) and

c

is the speed of light. The vector

er'

is a unit vector pointing from the observer to the charge and

r'

is the distance between observer and charge. Since the electromagnetic field propagates at the speed of light, both these quantities are evaluated at the retarded time

t-r'/c

.

The first term in the formula for

E

represents the Coulomb's law for the static electric field. The second term is the time derivative of the first Coulombic term multiplied by
r'
c
which is the propagation time of the electric field. Heuristically, this can be regarded as nature "attempting" to forecast what the present field would be by linear extrapolation to the present time. The last term, proportional to the second derivative of the unit direction vector

er'

, is sensitive to charge motion perpendicular to the line of sight. It can be shown that the electric field generated by this term is proportional to

at/r'

, where

at

is the transverse acceleration in the retarded time. As it decreases only as

1/r'

with distance compared to the standard

1/r'2

Coulombic behavior, this term is responsible for the long-range electromagnetic radiation caused by the accelerating charge.

The Heaviside–Feynman formula can be derived from Maxwell's equations using the technique of the retarded potential. It allows, for example, the derivation of the Larmor formula for overall radiation power of the accelerating charge.

Discussion

There is a widespread interpretation of Maxwell's equations indicating that spatially varying electric and magnetic fields can cause each other to change in time, thus giving rise to a propagating electromagnetic wave[6] (electromagnetism). However, Jefimenko's equations show an alternative point of view.[7] Jefimenko says, "...neither Maxwell's equations nor their solutions indicate an existence of causal links between electric and magnetic fields. Therefore, we must conclude that an electromagnetic field is a dual entity always having an electric and a magnetic component simultaneously created by their common sources: time-variable electric charges and currents."[8]

As pointed out by McDonald,[9] Jefimenko's equations seem to appear first in 1962 in the second edition of Panofsky and Phillips's classic textbook.[10] David Griffiths, however, clarifies that "the earliest explicit statement of which I am aware was by Oleg Jefimenko, in 1966" and characterizes equations in Panofsky and Phillips's textbook as only "closely related expressions". According to Andrew Zangwill, the equations analogous to Jefimenko's but in the Fourier frequency domain were first derived by George Adolphus Schott in his treatise Electromagnetic Radiation (University Press, Cambridge, 1912).[11]

Essential features of these equations are easily observed which is that the right hand sides involve "retarded" time which reflects the "causality" of the expressions. In other words, the left side of each equation is actually "caused" by the right side, unlike the normal differential expressions for Maxwell's equations where both sides take place simultaneously. In the typical expressions for Maxwell's equations there is no doubt that both sides are equal to each other, but as Jefimenko notes, "... since each of these equations connects quantities simultaneous in time, none of these equations can represent a causal relation."[12]

See also

Notes and References

  1. [Oleg D. Jefimenko]
  2. Introduction to Electrodynamics (3rd Edition), D. J. Griffiths, Pearson Education, Dorling Kindersley, 2007, .
  3. Oleg D. Jefimenko, Solutions of Maxwell's equations for electric and magnetic fields in arbitrary media, American Journal of Physics 60 (10) (1992), 899–902.
  4. https://feynmanlectures.caltech.edu/II_21.html#Ch21-S5 The Feynman Lectures on Physics - 21.5 The potentials of a moving charge; the general solution of Liénard and Wiechert
  5. https://feynmanlectures.caltech.edu/I_28.html#Ch28-S1-p10 The Feynman Lectures on Physics Vol. I Ch. 28: Electromagnetic Radiation
  6. Kinsler, P.. 2011. How to be causal: time, spacetime, and spectra. Eur. J. Phys.. 32. 6. 1687. 10.1088/0143-0807/32/6/022. 1106.1792 . 2011EJPh...32.1687K . 56034806.
  7. Oleg D. Jefimenko, Causality Electromagnetic Induction and Gravitation, 2nd ed.: Electret Scientific (Star City - 2000) Chapter 1, Sec. 1-4, page 16 .
  8. [Oleg D. Jefimenko]
  9. Kirk T. McDonald, The relation between expressions for time-dependent electromagnetic fields given by Jefimenko and by Panofsky and Phillips, American Journal of Physics 65 (11) (1997), 1074-1076.
  10. Wolfgang K. H. Panofsky, Melba Phillips, Classical Electricity And Magnetism, Addison-Wesley (2nd. ed - 1962), Section 14.3. The electric field is written in a slightly different - but completely equivalent - form. Reprint: Dover Publications (2005), .
  11. Andrew Zangwill, Modern Electrodynamics, Cambridge University Press, 1st edition (2013), pp. 726—727, 765
  12. [Oleg D. Jefimenko]