capacitance and laplace’s equation
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Capacitance and Laplace’s Equation• Capacitance Definition• Simple Capacitance Examples• Capacitance Example using Streamlines & Images
– Two-wire Transmission Line
– Conducting Cylinder/Plane
• Field Sketching• Laplace and Poison’s Equation• Laplace’s Equation Examples• Laplace’s Equation - Separation of variables• Poisson’s Equation Example
Potential of various charge arrangements• Point
• Line (coaxial)
• Sheet
• V proportional to Q, with some factor involving geometry
• Define
Basic Capacitance Definition
A simple capacitor consists of two oppositely charged conductors surrounded by a uniform dielectric.
An increase in Q by some factor results in an increase D (and E) by same factor.
With the potential difference between conductors: Q
-QE, D
S
B
A
.
.
increasing by the same factor -- so the ratio Q to V0 is constant. We define the capacitance of the structure as the ratio of stored charge to applied voltage, or
Units are Coul/V or Farads
Example 1 - Parallel-Plate Capacitor - I
Plate area = S
Applying boundary conditions for D at surface of a perfect conductor:
Lower plate:
Upper Plate:
Same result either way!
Electric field between plates is therefore:
The horizontal dimensions are assumed to be much greater than the plate separation, d. The electric field thus lies only in the z direction, with the potential varying only with z.
Boundary conditions needed at only one surface to obtain total field between plates.
Example 1 - Parallel-Plate Capacitor - II
Combining with capacitance is
Plate area = S
With Electric Field
The voltage between plates is:
NoteIn region between plates𝜵 ∙𝑫=0
Energy Stored in parallel-plate CapacitorStored energy is found by integrating the energy density in the electric field over the capacitor volume.
C V02
S
Gives 3 ways of stored energy:
Rearranging gives
𝑊 𝐸=12 ∫𝑣𝑜𝑙𝜌𝑣𝑉 𝑑𝑣=¿ 1
2 ∫𝑣𝑜𝑙
(𝛻 ∙𝐷 )𝑉 𝑑𝑣¿
𝑊 𝐸=12 ∫𝑣𝑜𝑙𝐷 ∙𝛻𝑉 𝑑𝑣=1
2 ∫𝑣𝑜𝑙𝐷∙𝐸 𝑑𝑣
From Chapter 4 page 102
Example 2 - Coaxial Transmission Line - I
E = 0 elsewhere, assuming hollow inner conductor, equal and opposite charges on inner and outer conductors.
Coaxial Electric Field using Gauss’ Law:
S
E
1
assume a unit length in z
𝐸=𝜌𝑙
2𝜋𝜌𝜀 𝒂𝝆
Writing with surface-charge density
𝐸=2𝜋 𝑎𝜌 𝑠2𝜋𝜌𝜀 𝒂𝝆
Simplifying
Example 2 - Coaxial Transmission Line - IIElectric Field between conductors
S
E
1
Potential difference between conductors:
Charge per unit length on inner conductor
Gives capacitance:
assume unit length in z
Example 3 – Concentric Spherical CapacitorTwo concentric spherical conductors of radii a and b, with equal and opposite charges Q on inner and outer conductors.
a
b
QE -Q
From Gauss’ Law, electric field exists only between spheres and is given by:
Potential difference between inner and outer spheres is
Capacitance is thus:Note as (isolated sphere)
Example 4 - Sphere with Dielectric Coating
a
r1
E1
E2
Q
A conducting sphere of radius a carries charge Q. A dielectric layer of thickness (r1 – a) and of permittivity 1 surrounds the conductor. Electric field in the 2 regions is found from Gauss’ Law
The potential at the sphere surface (relative to infinity) is:
= V0
The capacitance is:
Example 5 – Parallel Capacitor with 2-Layer Dielectric
Surface charge on either plate is normal displacement DN through both dielectrics:
Potential between top and bottom surfaces
<< Rule for 2 capacitors in series
𝜌𝑆1=𝑫𝑵 𝟏=𝑫𝑵𝟐=𝜌𝑆 2
𝑉 𝑜=𝑬𝟏𝑑1+𝑬𝟐𝑑2
𝑉 𝑜=𝑫𝟏
𝜀1𝑑1+
𝑫𝟐
𝜀2𝑑2
𝜀1 𝑬𝟏=𝑫𝑵 𝟏𝑫𝑵𝟐=𝜀2 𝑬𝟐
𝑉 𝑜=𝜌𝑆(𝑑1
𝜀1+𝑑2
𝜀2)=𝑄𝑆 (𝑑1
𝜀1+𝑑2
𝜀2)
𝐶=𝑄𝑉 𝑜
=1
1𝑆 (𝑑1
𝜀1+𝑑2
𝜀2 )=
1
( 𝑑1
𝜀1𝑆+𝑑2
𝜀2𝑆 )=
1
( 1𝐶1
+ 1𝐶2 )
The capacitance is thus:
y
xh
b
V = V0
V = 0
.l
a
Example 6Two Parallel Wires vs. Conducting-Cylinder/Plane
Two parallel wires Conducting cylinder/plane
Parallel wires on left substitute conducting cylinder/plane on right• Equipotential streamline for wires on left match equipotential surface for cylinder on right.• Image wire (-a) on left emulates vertical conducting plane on right.
Example 6 - Two Parallel Wires and Conducting-Cylinder/Plane
• Parallel Wires1. Superimpose 2 long-wire potentials at x = +a and x = -a.
2. Translate to common rectangular coordinate system.
3. Define parameter K (=constant) for V (=constant) equipotential.
4. Find streamlines (x,y) for constant K and constant V.
• Conducting-Cylinder/Plane1. Insert metal cylinder along equipotential (constant K) streamline.
2. Work backward to find long-wire position, charge density, and K parameter from cylinder diameter, offset, and V potential.
3. Calculate capacitance of cylinder/plane from long-wire position and charge density
4. Write expression for potential, D, and E fields between cylinder and plane.
5. Write expression for surface charge density on plane.
Two Parallel Wires – Basic Potential
Begin with potential of single line charge on z axis, with zero reference at = R0
Then write potential for 2 line charges of opposite sign positioned at x = +a and x = -a
2 Parallel Wires – Rectangular Coordinates
2 line charges of opposite sign:
Choose a common reference radius R10 = R20 . Write R1 and R2 in terms of common rectangular coordinates x, y.
2 Parallel Wires – Using Parameter K
Two opposite line charges in rectangular coordinates :
Corresponding to equipotential surface V = V1 for dimensionless parameter K = K1
Write ln( ) term as parameter K1:
Corresponding to potential V = V1 according to:
𝑉=𝜌𝐿
4𝜋𝜀 𝑙𝑛(𝑥+𝑎 )2+𝑦 2
(𝑥−𝑎)2+ 𝑦2 =𝜌𝐿
4𝜋𝜀 𝑙𝑛 (𝐾 )
2 Parallel Wires – Getting Streamlines for KFind streamlines for constant parameter K1 where voltage is constant V1
To better identify surface, expand the squares, and collect terms:
Equation of circle (cylinder) with radius b and displaced along x axis h
y
xh
b
V = V0
V = 0
l
a
2 Parallel Wires - Substituting Conducting-Cylinder/Plane
Find physical parameters of wires (a, ρL, K1) from streamline parameters (h, b, Vo)
Eliminate a in h and b equations to get quadratic
Substitution above gives image wire position as function of cylinder diameter/offset
and
Solution gives K parameter as function of cylinder diameter/offset
Choose positive sign for positive value for a
y
xh
b
V = V0
V = 0
l
a
Getting Capacitance of Conducting-Cylinder/Plane
Equivalent line charge l for conducting cylinder is located at
From original definition or
Capacitance for length L is thus
y
xh
b
V = V0
V = 0
.l
a
Example 1 - Conducting Cylinder/Plane
y
xh
b
V = V0
V = 0
.l
a
Conducting cylinder radius b = 5 mm, offset h = 13 mm, potential V0 = 100 V. Find offset of equivalent line charge a, parameter K, charge density l , and capacitance C.
mm
Charge density and capacitance
Results unchanged so long as relative proportions maintained
Example 2 - Conducting Cylinder/Plane
𝜌𝐿=4𝜋𝜀𝑉 𝑜
ln (𝐾 1)=3.46𝑛𝐶 /𝑚
For V0 = 50-volt equipotential surface we recalculate cylinder radius and offset
mm
mm
The resulting surface is the dashed red circle
𝐶=2𝜋𝜀
h𝑐𝑜𝑠 − 1¿¿
Getting Fields for Conducting Cylinder/Plane• Gradient of Potential
• Electric Field
• Displacement
• For original 5 mm cylinder diameter, 13 mm offset, and 12 mm image-wire offset
• Where max and min are between cylinder and ground plane, and opposite ground plane
y
xhb
V = V0
V = 0
l
a
Getting Capacitance of 2-Wire or 2-Cylinder Line
With two wires or cylinders (and zero potential plane between them) the structure represents two wire/plane or two cylinder/plane capacitors in series, so the overall capacitance is half that derived previously. x
b
h
L
Finally, if the cylinder (wire) dimensions are muchless than their spacing (b << h), then
Using Field Sketches to Estimate Capacitance
This method employs these properties of conductors and fields:
Sketching Equipotentials
Given the conductor boundaries, equipotentials may be sketched in. An attempt is made to establish approximately equal potential differences between them.
A line of electric flux density, D, is then started (at point A), and then drawn such that it crossesequipotential lines at right-angles.
Total Capacitance as # of Flux/Voltage Increments
For conductor boundaries on left and right, capacitance is
𝐶=𝑄𝑉 =
Ψ𝑉
Writing with # flux increments and # voltage increments
𝐶=𝑁𝑄∆𝑄𝑁 𝑉 ∆𝑉
Electrode
Electrode
Capacitance of Individual Flux/Voltage Increments
Writing flux increment as flux density times area (1 m depth into page)
∆𝑄=∆ Ψ=𝐷1 ∆ 𝐿𝑄=𝜀𝐸 ∆ 𝐿𝑄
Writing voltage increment as Electric field times distance
∆𝑉=𝐸∆ 𝐿𝑉
Forming ratio
∆𝑄∆𝑉 =
𝜀 𝐸∆ 𝐿𝑄𝐸∆ 𝐿𝑉
=𝜀∆ 𝐿𝑄∆ 𝐿𝑉
=𝜀(𝑠𝑖𝑑𝑒𝑟𝑎𝑡𝑖𝑜)
Total Capacitance for Square Flux/Voltage Increments
Capacitance between conductor boundaries
𝐶=𝑁𝑄∆𝑄𝑁 𝑉 ∆𝑉
Combining with flux/voltage ratio
𝐶=𝑁𝑄
𝑁 𝑉𝜀
∆𝐿𝑄∆ 𝐿𝑉
=𝜀𝑁𝑄
𝑁 𝑉
Provided ΔLQ = ΔLV (increments square)
Field sketch example I
Field Sketch Example II
Laplace and Poisson’s Equation
1. Assert the obvious– Laplace - Flux must have zero divergence in empty
space, consistent with geometry (rectangular, cylindrical, spherical)
– Poisson - Flux divergence must be related to free charge density
2. This provides general form of potential and field with unknown integration constants.
3. Fit boundary conditions to find integration constants.
Derivation of Poisson’s and Laplace’s Equations
These equations allow one to find the potential field in a region, in which values of potential or electric fieldare known at its boundaries.
Start with Maxwell’s first equation:
where
and
so that
or finally:
Poisson’s and Laplace’s Equations (continued)
Recall the divergence as expressed in rectangular coordinates:
…and the gradient:
then:
It is known as the Laplacian operator.
𝜵=𝜕𝜕 𝑥 𝒂𝒙+
𝜕𝜕 𝑦 𝒂𝒚+
𝜕𝜕 𝑧 𝒂𝒛 →𝛻2=𝜵 ∙𝜵=
𝜕2
𝜕𝑥2 +𝜕2
𝜕 𝑦 2 +𝜕2
𝜕 𝑧2
Summary of Poisson’s and Laplace’s Equations
we already have:
which becomes:
This is Poisson’s equation, as stated in rectangular coordinates.
In the event that there is zero volume charge density, the right-hand-side becomes zero, and we obtain Laplace’s equation:
Laplacian Operator in Three Coordinate Systems
(Laplace’s equation)
Example 1 - Parallel Plate Capacitor
d
0
x
V = V0
V = 0
Plate separation d smaller than plate dimensions. Thus V varies only with x. Laplace’s equation is:
Integrate once:
Integrate againBoundary conditions:
1. V = 0 at x = 0
2. V = V0 at x = d
where A and B are integration constants evaluated according to boundary conditions.
Get general expression for potential function
Parallel Plate Capacitor II
General expression:
Boundary condition 1:
0 = A(0) + B
Boundary condition 2:
V0 = Ad
Finally:
d
0
x
V = V0
V = 0
Boundary conditions:
1. V = 0 at x = 0
2. V = V0 at x = d
EquipotentialSurfaces
Apply boundary conditions
Parallel Plate Capacitor III
Potential
Electric Field
Displacement
d
0
x
V = V0
V = 0
EquipotentialSurfaces
E+ + + + + + + + + + + + + +
- - - - -- - - - - - - - -
Surface Area = S
n
At the lower plate n = ax
Conductor boundary condition
Total charge onlower plate capacitance
Getting 1) Electric field, 2) Displacement, 3) Charge density, 4) Capacitance
Example 2 - Coaxial Transmission Line
V0
E
L
V = 0
Boundary conditions:
1. V = 0 at b2. V = V0 at a
V varies with radius only, Laplace’s equation is:
(>0)
Integrate once:
Integrate again:
Get general expression for potential
Coaxial Transmission Line II
V0
E
L
V = 0
Boundary conditions:
1. V = 0 at b2. V = V0 at a
General Expression
Boundary condition 1:
Boundary condition 2:
Combining:
Apply boundary conditions
Coaxial Transmission Line III
V0
E
L
V = 0
Potential:
Electric Field:
Charge density on inner conductor:
Total charge on inner conductor:Capacitance:
Getting 1) Electric field, 2) Displacement, 3) Charge density, 4) Capacitance
Example 3 - Angled Plate Geometry
Cylindrical coordinates, potential varies only with
x
Boundary Conditions:
1. V = 0 at 02. V =V0 at
Integrate once:
Integrate again:
Boundary condition 1:
Boundary condition 2:
Potential: Field:
Get general expression, apply boundary conditions, get electric field
Example 4 - Concentric Sphere Geometry
a
b
V0
E
V = 0
Boundary Conditions:
1. V = 0 at r = b2. V = V0 at r = a
V varies only with radius. Laplace’s equation:
or:
Integrate once: Integrate again:
Boundary condition 1:
Boundary condition 2:
Potential:
Get general expression, apply boundary conditions
Concentric Sphere Geometry II
a
b
V0
E
V = 0Potential: (a < r < b)
Electric field:
Charge density on inner conductor:
Total charge on inner conductor:
Capacitance:
Get 1) electric field, 2) displacement, 3) charge density, 4) capacitance
Example 5 – Cone and Plane Geometry
V varies only with only, Laplace’s equation is:
Integrate once:
R, >
Integrate again
Boundary Conditions:
1. V = 0 at 2. V = V0 at
Boundary condition 1:
Boundary condition 2:
Potential:
Get general expression, apply boundary conditions
Cone and Plane Geometry II
r1
r2
Potential:
Electric field:
Get electric field
Check symboliccalculators
Cone and Plane Geometry III
r1
r2
Charge density on cone surface:
Total charge on cone surface:
Capacitance: Neglects fringing fields, important for smaller .
Note capacitance positive (as should be).
Get 1) charge density, 2) capacitance
Example 6 – Product Solution in 2 Dimensions
𝛻2𝑉=0 [ 𝜕2
𝜕 𝑥2 +𝜕2
𝜕 𝑦2 + 𝜕2
𝜕𝑧 2 ] [𝑋 (𝑥 )𝑌 ( 𝑦 )𝑍 (𝑧 ) ]=0
Product Solution in 2 Dimensions II
Paul Lorrain and Dale Corson, “Electromagnetic Fields and Waves” 2nd Ed, W.H. Freeman, 1970
Product Solution in 2 Dimensions III
Product Solution in 2 Dimensions IV
This problem just keeps on going!
Product Solution in 2 Dimensions V
Product Solution in 2 Dimensions VI
Example 7 – Another Product Solution in 2 Dimensions
Another Product Solution in 2 Dimensions II
Another Product Solution in 2 Dimensions III
Poisson’s equation example p-n junction – zero bias
• p-type for x < 0, n-type for x > 0.• holes diffuse to right, electrons diffuse to left.• creates electric field to left (depletion layer).• electric field to left inhibits further hole movement right, electron movement left.
en.wikipedia.org/wiki/P-n_junction
p-n junction – zero bias
p-n junction – forward/reverse bias
Applied fieldApplied field
p-n junction – charge, field, potential
p-n junction – Obtaining Electric Field
p-n junction – Obtaining Potential
p-n junction - Obtaining Charge
p-n junction Obtaining Junction Capacitance
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