Post on 18-Feb-2020
Hao Mei
The University of South Dakota
Wednesday, Nov. 05, 2014
Vector and Scalar Potentials
1
Maxwell Equations
2
π» Β· π· = Ο Coulombβs Law
π» Γ π» = π½ +ππ·
ππ‘ Ampereβs Law
π» Β· π΅ = 0 Absence of free magnetic poles
π» Γ πΈ +ππ΅
ππ‘= 0 Faradayβs Law
Potentials(Ξ¦ and π΄ )
3
If a curl of a vector field (πΉ ) vanishes(everywhere), then πΉ can be written as the gradient of a scalar potentials (Ξ¦):
π» x πΉ = 0 βΊ πΉ = β π»Ξ¦
If a divergence of a vector field (πΉ ) vanishes(everywhere),
then πΉ can be written as the curl of a vector potentials (π΄ ):
π» Β· πΉ = 0 βΊ πΉ = π» x π΄
Potentials(Ξ¦ and π΄ )
4
Since π» Β· π΅ = 0, we can still define π΅ in terms of a vector potential:
π΅ = π» x π΄ (1)
Then the Faradayβs law can be written:
π» Γ πΈ +ππ΅
ππ‘= π» Γ πΈ +
π(π» x π΄ )ππ‘
= π» Γ (πΈ +ππ΄
ππ‘)
= 0
Potentials(Ξ¦ and π΄ )
5
Recall the definition of scalar potentials:
π» x πΉ = 0 βΊ πΉ = β π»Ξ¦
here we have
π» Γ πΈ +ππ΄
ππ‘= 0
The vanishing curl means that we can define a scalar potential Ξ¦ satisfying:
βπ»Ξ¦ = πΈ +ππ΄
ππ‘
or πΈ = βπ»Ξ¦ βππ΄
ππ‘ (2)
Maxwell equations in terms of Vector and Scalar Potentials
6
Combining Equations (1) and (2),
π΅ = π» x π΄ , πΈ = βπ»Ξ¦ βππ΄
ππ‘
These two equations, which is the definitions of π΅ and πΈ in
terms of Ξ¦ and π΄ , automatically satisfy the two homogeneous Maxwell equations.
This reduces the number of equations from 4 to 2.
Then the dynamic behavior of Ξ¦ and π΄ will be determined by the two inhomogeneous equations.
Maxwell equations in terms of Vector and Scalar Potentials
7
At this stage we restrict our considerations to the vacuum form of the Maxwell equations.
Recall that Ο΅0ΞΌ0 =1
π2 , and π» =π΅
ΞΌ0, π· = Ο΅0πΈ.
Then the two inhomogeneous equations become
π» Β· π· = Ο π» Β· πΈ =Ο
Ο΅0
π» Β· (βπ»Ξ¦ βππ΄
ππ‘) =
Ο
Ο΅0
π»2Ξ¦ +π(π»Β·π΄ )
ππ‘= β
Ο
Ο΅0 (3)
Maxwell equations in terms of Vector and Scalar Potentials
8
π» Γ π» = π½ +ππ·
ππ‘, π» =
π΅
ΞΌ0, π· = Ο΅0πΈ
π» Γπ΅
ΞΌ0= π½ +
π(Ο΅0πΈ)
ππ‘
π» Γ π΅ = ΞΌ0π½ + Ο΅0ΞΌ0ππΈ
ππ‘
π» Γ π» x π΄ = ΞΌ0π½ + Ο΅0ΞΌ0π
ππ‘(βπ»Ξ¦ β
ππ΄
ππ‘)
= ΞΌ0π½ β Ο΅0ΞΌ0π
ππ‘(π»Ξ¦ +
ππ΄
ππ‘)
Maxwell equations in terms of Vector and Scalar Potentials
9
Using the identity( in Jackson cover):
π» Γ π» x π΄ = π» π»Β·π΄ β π»2π΄
π»2π΄ β1
π2
π2π΄
ππ‘2 β π»(π»Β·π΄ +1
π2
πΞ¦
ππ‘) = βΞΌ0π½ (4)
The four first order coupled differential equations (Maxwell equations) reduce to two second order differential equations, but they are still coupled.
π»2Ξ¦ +π(π» Β· π΄ )
ππ‘= β
Ο
Ο΅0
π»2π΄ β1
π2
π2π΄
ππ‘2 β π»(π»Β·π΄ +1
π2
πΞ¦
ππ‘) = βΞΌ0π½
Gauge Transformation
10
Since π΅ = π» x π΄ , the vector potential is arbitrary to the extent that the gradient of some scalar function Ι can be added.
π΅ is unchanged by the transformation:
π΄ π΄β² = π΄ + π»Ι
β’ For πΈ to remain unchanged as well, we require
ΦΦⲠ= Ξ¦ βπΙ
ππ‘
Quick check: πΈ = βπ»Ξ¦ βππ΄
ππ‘
βπ»Ξ¦β² βππ΄β²
ππ‘= βπ» Ξ¦ β
ππ΄
ππ‘β
π π΄ + π»Ι
ππ‘
= βπ»Ξ¦ +π
ππ‘π»Ι β
ππ΄
ππ‘β
π
ππ‘π»Ι
= πΈ
Lorenz condition and wave equations
11
We can use gauge freedom to specify useful conditions on
Ξ¦, π΄ .
Until now only π» x π΄ has been specified; the choice of π»Β·π΄ is still arbitrary. Imposing the so-called Lorenz condition:
π»Β·π΄ +1
π2
πΞ¦
ππ‘= 0
Applying the Lorenz condition, it will decouples Eqs.(3) and (4), and results in a considerable simplification:
Lorenz condition and wave equations
12
For Equation (3): π»2Ξ¦ +π(π»Β·π΄ )
ππ‘= β
Ο
Ο΅0
applying the Lorenz condition:
π»Β·π΄ +1
π2
πΞ¦
ππ‘= 0
So, π»2Ξ¦ βπ(
1
π2πΞ¦
ππ‘)
ππ‘= β
Ο
Ο΅0
π»2Ξ¦ β1
π2
π2Ξ¦
ππ‘2 = βΟ
Ο΅0 (5)
Lorenz condition and wave equations
13
For Equation (4): π»2π΄ β1
π2
π2π΄
ππ‘2 β π»(π»Β·π΄ +1
π2
πΞ¦
ππ‘) = βΞΌ0π½
applying the Lorenz condition:
π»Β·π΄ +1
π2
πΞ¦
ππ‘= 0
So, π»2π΄ β1
π2
π2π΄
ππ‘2 β π»(0) = βΞΌ0π½
π»2π΄ β1
π2
π2π΄
ππ‘2 = βΞΌ0π½ (6)
Equations (5) and (6), form a set of equations equivalent in all respects to the Maxwell Equations in vacuum. Thus, the Lorentz condition makes and satisfies inhomogeneous wave equations of similar forms.
Questions and Discussion
14
Thanks!