Time-Harmonic Magnetic Fields
In the time-harmonic case, there is no computational cost for including the displacement current in Ampère’s law (then called Maxwell-Ampère’s law):
In the transient case, the inclusion of this term leads to a second-order equation in time, but in the harmonic case there are no such complications. Using the definition of the electric and magnetic potentials, the system of equations becomes:
The constitutive relation
D
= ε
0
E
+
P
has been used for the electric field.
To obtain a particular gauge that reduces the system of equation, choose
Ψ = −
jV
/ω
in the gauge transformation. This gives:
When
vanishes from the equations, only the second one is needed,
Working with
is often the best option when it is possible to specify all source currents as external currents
J
e
or as surface currents on boundaries.