∇·~ E~ = 4πρ∇×~ B~−^1
c∂E
∂t=
4 π
c~j.TheLorentz Forceis
F~=−e(E~+^1
c~v×B~).When we change toRationalized Heaviside-Lorentz units, the equations become
∇·~ B~= 0
∇×~ E~+^1
c∂B
∂t= 0
∇·~ E~=ρ
∇×~ B~−^1
c∂E
∂t=
1
c~jF~=−e(E~+^1
c~v×B~)That is, the equations remain the same except the factors of 4πin front of the source terms disappear.
Of course, it would still be convenient to setc= 1 since this has been confusing us about 4D geometry
andcis the last unnecessary constant in Maxwell’s equations. For our calculations, we can setc= 1
any time we want unless we need answers in centimeters.
32.2 The Electromagnetic Field Tensor
The transformation of electric and magnetic fields under a Lorentzboost we established even before
Einstein developed the theory of relativity. We know that E-fields can transform into B-fields and
vice versa. For example, a point charge at rest gives an Electric field. If we boost to a frame in which
the charge is moving, there is an Electric and a Magnetic field. This means that the E-field cannot
be a Lorentz vector. We need to put the Electric and Magnetic fieldstogether into one (tensor)
object to properly handle Lorentz transformations and to write our equations in a covariant way.
The simplest way and the correct way to do this is to make the Electricand Magnetic fields com-
ponents of arank 2 (antisymmetric) tensor.
Fμν=
0 Bz −By −iEx
−Bz 0 Bx −iEy
By −Bx 0 −iEz
iEx iEy iEz 0
The fields can simply be written in terms of thevector potential, (which is a Lorentz vector)
Aμ= (A,iφ~ ).
Fμν=∂Aν
∂xμ−
∂Aμ
∂xν