Prof. Ji Chen Adapted from notes by Prof. Stuart A. Long Notes 5 Poynting Theorem ECE 3317 1 Spring...
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Transcript of Prof. Ji Chen Adapted from notes by Prof. Stuart A. Long Notes 5 Poynting Theorem ECE 3317 1 Spring...
1
Prof. Ji Chen
Adapted from notes by Prof. Stuart A. Long
Notes 5 Poynting Theorem
ECE 3317
Spring 2014
2
Poynting Theorem
The Poynting theorem is one on the most important in EM theory. It tells us the power flowing in an electromagnetic field.
John Henry Poynting (1852-1914)
John Henry Poynting was an English physicist. He was a professor of physics at Mason Science College (now the University of Birmingham) from 1880 until his death.
He was the developer and eponym of the Poynting vector, which describes the direction and magnitude of electromagnetic energy flow and is used in the Poynting theorem, a statement about energy conservation for electric and magnetic fields. This work was first published in 1884. He performed a measurement of Newton's gravitational constant by innovative means during 1893. In 1903 he was the first to realize that the Sun's radiation can draw in small particles towards it. This was later coined the Poynting-Robertson effect.
In the year 1884 he analyzed the futures exchange prices of commodities using statistical mathematics.
(Wikipedia)
3
Poynting Theorem
BE
tD
H Jt
From these we obtain:
BH E H
tD
E H J E Et
4
Poynting Theorem (cont.)
BH E H
tD
E H J E Et
Subtract, and use the following vector identity:
H E E H E H
B DE H J E H E
t t
We then have:
5
Poynting Theorem (cont.)
J E
B DE H J E H E
t t
Next, assume that Ohm's law applies for the electric current:
B DE H E E H E
t t
2 B DE H E H E
t t
or
6
Poynting Theorem (cont.)
2 B DE H E H E
t t
From calculus (chain rule), we have that
1
2
1
2
D EE E E E
t t t
B HH H H H
t t t
2 1 1
2 2E H E H H E E
t t
Hence we have
7
Poynting Theorem (cont.)
2 1 1
2 2E H E H H E E
t t
2 2 21 1
2 2E H E H E
t t
This may be written as
or
2 2 21 1
2 2E H E H E
t t
8
Poynting Theorem (cont.)
Final differential (point) form of Poynting theorem:
2 2 21 1
2 2E H E H E
t t
9
Poynting Theorem (cont.)
Volume (integral) form
2 2 21 1
2 2E H E H E
t t
Integrate both sides over a volume and then apply the divergence theorem:
2 2 21 1
2 2V V V V
E H dV E dV H dV E dVt t
2 2 21 1ˆ
2 2S V V V
E H n dS E dV H dV E dVt t
10
Poynting Theorem (cont.)
Final volume form of Poynting theorem:
2 2 21 1ˆ
2 2S V V V
E H n dS E dV H dV E dVt t
For a stationary surface:
2 2 21 1ˆ
2 2S V V V
E H n dS E dV H dV E dVt t
11
Poynting Theorem (cont.)
Physical interpretation:
2 2 21 1ˆ
2 2S V V V
E H n dS E dV H dV E dVt t
Power dissipation as heat (Joule's law)
Rate of change of stored magnetic energy
Rate of change of stored electric energy
Right-hand side = power flowing into the region V.
(Assume that S is stationary.)
12
Poynting Theorem (cont.)
ˆS
E H n dS power flowing into the region
ˆS
E H n dS power flowing out of the region
Or, we can say that
Define the Poynting vector: S E H
Hence
ˆS
S n dS power flowing out of the region
13
Poynting Theorem (cont.)
ˆS
S n dS power flowing out of the region
Analogy:
ˆS
J n dS current flowing out of the region
J = current density vector
S = power flow vector
14
Poynting Theorem (cont.)
S E H
E
H
S
direction of power flow
The units of S are [W/m2].
15
Power Flow
The power P flowing through the surface S (from left to right) is:
ˆS
P S n dS
surface S
n̂
S E H
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Time-Average Poynting Vector
, , , , , , , , ,S x y z t E x y z t H x y z t
*1Re E H
2S t E t H t
Assume sinusoidal (time-harmonic) fields)
, , , Re E , , j tE x y z t x y z e
, , , Re H , , j tH x y z t x y z e
From our previous discussion (notes 2) about time averages, we know that
17
Complex Poynting Vector
Define the complex Poynting vector:
We then have that
*1S E H
2
, , , = Re S , ,S x y z t x y z
Note: The imaginary part of the complex Poynting vector corresponds to the VARS flowing in space.
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Complex Power Flow
The complex power P flowing through the surface S (from left to right) is:
surface S
n̂
ˆP SS
n dS
*1S E H
2
Re P
Im P
Watts
Vars
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Complex Poynting Vector (cont.)
What does VARS mean?
2 21 1VARS 2
4 4
2
V
m e
H E dV
W W
E
H
VARS consumed Power (watts)consumed
ˆReSS
n dS Watts flowing in
ˆImSS
n dS VARS flowing in
Equation for VARS (derivation omitted):
The VARS flowing into the region V is equal to the difference in the time-average magnetic and electric stored energies inside the region (times a factor of 2).
Watts + VARS
V
S
20
Note on Circuit Theory
Although the Poynting vector can always be used to calculate power flow, at low frequency circuit theory can be used, and this is usually easier.
ˆS
P E H z dS
Example (DC circuit):
V0 R
S
PI
z
0P V I
The second form is much easier to calculate!
21
Example: Parallel-Plate Transmission Line
At z = 0:
w
hx
y
,
z
I
+-V
x
y
E
H
w
h
0V V jkzz e
0I I jkzz e
0V 0 V
0I 0 I
The voltage and current have the form of waves that travel along the line in the z direction.
22
0VˆE( , ,0)x y y
h
0IˆH , ,0x y x
w
At z = 0:
*1S E H
2
*
0 01ˆS
2
V Iz
h w
Example (cont.)
w
hx
y
,
z
I
+-V
x
y
E
H
w
h
(from ECE 2317)
23
Example (cont.)
*
0 0V I1ˆS
2z
h w
0 0 0 0
ˆP S Sh w h w
f zz dx dy dx dy
*
0 0V I1P
2f whh w
*0 0
1P V I
2f
Hence
w
hx
y
,
z
I
+-V
x
y
E
H
w
h