TEM, TE and TM Waves

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TEM, TE and TM Waves

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Title: TEM, TE and TM Waves

1
Lecture 2

TEM, TE and TM Waves
Coaxial Cable
Grounded Dielectric Slab Waveguides
Striplines and Microstrip Line
Design Formulas of Microstrip Line

2
Lecture 2

An Approximate Electrostatic Solution for
Microstrip Line
The Transverse Resonance Techniques
Wave Velocities and Dispersion

3
TEM, TE and EM Waves

transmission lines and waveguides are primarily
used to distribute microwave wave power from one
point to another
each of these structures is characterized by a
propagation constant and a characteristic
impedance if the line is lossy, attenuation is
also needed

4
TEM, TE and EM Waves

structures that have more than one conductor may
support TEM waves
let us consider the a transmission line or a
waveguide with its cross section being uniform
along the z-direction

5
TEM, TE and EM Waves

the electric and magnetic fields can be written
as
Where and are the transverse
components and and are the
longitudinal components

6
TEM, TE and EM Waves

in a source free region, Maxwells equations can
be written as
Therefore,

7
TEM, TE and EM Waves

each of the four transverse components can be
written in terms of and , e.g., consider Eqs.
(3) and (7)

8
TEM, TE and EM Waves

each of the four transverse components can be
written in terms of and , e.g., consider Eqs.
(3) and (7)

9
TEM, TE and EM Waves
10
TEM, TE and EM Waves

Similarly, we have
is called the cutoff wavenumber

11
TEM, TE and EM Waves

Transverse electromagnetic (TEM) wave implies
that both and are zero (TM,
transverse magnetic,
0, 0 TE, transverse electric,
0, 0)
the transverse components are also zero unless
is also zero, i.e.,

12
TEM, TE and EM Waves

now let us consider the Helmholtzs equation
note that and therefore, for TEM
wave, we have

13
TEM, TE and EM Waves

this is also true for , therefore, the
transverse components of the electric field (so
as the magnetic field) satisfy the
two-dimensional Laplaces equation

14
TEM, TE and EM Waves

Knowing that and
, and we have
while the current flowing on a conductor is given
by

15
TEM, TE and EM Waves

this is also true for , therefore, the
transverse components of the electric field (so
as the magnetic field) satisfy the
two-dimensional Laplaces equation

16
TEM, TE and EM Waves

Knowing that and
, we have
the voltage between two conductors is given by
while the current flowing on a conductor is given
by

17
TEM, TE and EM Waves

we can define the wave impedance for the TEM
mode
i.e., the ratio of the electric field to the
magnetic field, note that the components must be
chosen such that E x H is pointing to the
direction of propagation

18
TEM, TE and EM Waves

for TEM field, the E and H are related by

19
why is TEM mode desirable?

cutoff frequency is zero
no dispersion, signals of different frequencies
travel at the same speed, no distortion of
signals
solution to Laplaces equation is relatively easy

20
why is TEM mode desirable?

a closed conductor cannot support TEM wave as the
static potential is either a constant or zero
leading to
if a waveguide has more than 1 dielectric, TEM
mode cannot exists as cannot be zero in all
regions

21
why is TEM mode desirable?

sometime we deliberately want to have a cutoff
frequency so that a microwave filter can be
designed

22
TEM Mode in Coaxial Line

a coaxial line is shown here
the inner conductor is at a potential of Vo volts
and the outer conductor is at zero volts

23
TEM Mode in Coaxial Line

the electric field can be derived from the scalar
potential F in cylindrical coordinates, the
Laplaces equation reads
the boundary conditions are

24
TEM Mode in Coaxial Line

use the method of separation of variables, we let
substitute Eq. (21) to (18), we have
note that the first term on the left only depends
on r while the second term only depends on f

25
TEM Mode in Coaxial Line

if we change either r or f, the RHS should remain
zero therefore, each term should be equal to a
constant

26
TEM Mode in Coaxial Line

now we can solve Eqs. (23) and (24) in which only
1 variable is involved, the final solution to Eq.
(18) will be the product of the solutions to Eqs.
(23) and (24)
the general solution to Eq. (24) is

27
TEM Mode in Coaxial Line

boundary conditions (19) and (20) dictates that
the potential is independent of f, therefore
must be equal to zero and so as
Eq. (23) is reduced to solving

28
TEM Mode in Coaxial Line

the solution for R(r) now reads

29
TEM Mode in Coaxial Line

the electric field now reads
adding the propagation constant back, we have

30
TEM Mode in Coaxial Line

the magnetic field for the TEM mode
the potential between the two conductors are

31
TEM Mode in Coaxial Line

the total current on the inner conductor is
the surface current density on the outer
conductor is

32
TEM Mode in Coaxial Line

the total current on the outer conductor is
the characteristic impedance can be calculated as

33
TEM Mode in Coaxial Line

higher-order modes exist in coaxial line but is
usually suppressed
the dimension of the coaxial line is controlled
so that these higher-order modes are cutoff
the dominate higher-order mode is mode,
the cutoff wavenumber can only be obtained by
solving a transcendental equation, the
approximation is often
used in practice

34
Surface Waves on a Grounded Dielectric Slab

a grounded dielectric slab will generate surface
waves when excited
this surface wave can propagate a long distance
along the air-dielectric interface
it decays exponentially in the air region when
move away from the air-dielectric interface

35
Surface Waves on a Grounded Dielectric Slab

while it does not support a TEM mode, it excites
at least 1 TM mode
assume no variation in the y-direction which
implies that
write equation for the field in each of the two
regions
match tangential fields across the interface

36
Surface Waves on a Grounded Dielectric Slab

for TM modes, from Helmholtzs equation we have
which reduces to

37
Surface Waves on a Grounded Dielectric Slab

Define

38
Surface Waves on a Grounded Dielectric Slab

the general solutions to Eqs. (32) and (33) are
the boundary conditions are
tangential E are zero at x 0 and x
tangential E and H are continuous at x d

39
Surface Waves on a Grounded Dielectric Slab

tangential E at x0 implies B 0
tangential E 0 when x implies C 0
continuity of tangential E implies
tangential H can be obtained from Eq. (10) with

40
Surface Waves on a Grounded Dielectric Slab

tangential E at x0 implies B 0
tangential E 0 when x implies C 0
continuity of tangential E implies

41
Surface Waves on a Grounded Dielectric Slab

continuity of tangential H implies
taking the ratio of Eq. (34) to Eq. (35) we have

42
Surface Waves on a Grounded Dielectric Slab

note that
lead to
Eqs. (36) and (37) must be satisfied
simultaneously, they can be solved for by
numerical method or by graphical method

43
Surface Waves on a Grounded Dielectric Slab

to use the graphical method, it is more
convenient to rewrite Eqs. (36) and (37) into the
following forms

44
Surface Waves on a Grounded Dielectric Slab

Eq. (39) is an equation of a circle with a radius
of , each interception point
between these two curves yields a solution

45
Surface Waves on a Grounded Dielectric Slab

note that there is always one intersection point,
i.e., at least one TM mode
the number of modes depends on the radius r which
in turn depends on the d and
h has been chosen a positive real number, we can
also assume that is positive
the next TM will not be excited unless

46
Surface Waves on a Grounded Dielectric Slab

In general, mode is excited if
the cutoff frequency is defined as

47
Surface Waves on a Grounded Dielectric Slab

once and h are found, the TM field components
can be written as for

48
Surface Waves on a Grounded Dielectric Slab

For
similar equations can be derived for TE fields

49
Striplines and Microstrip Lines

various planar transmission line structures are
shown here

50
Striplines and Microstrip Lines

the strip line was developed from the square
coaxial

51
Striplines and Microstrip Lines

since the stripline has only 1 dielectric, it
supports TEM wave, however, it is difficult to
integrate with other discrete elements and
excitations
microstrip line is one of the most popular types
of planar transmission line, it can be fabricated
by photolithographic techniques and is easily
integrated with other circuit elements

52
Striplines and Microstrip Lines

the following diagrams depicts the evolution of
microstrip transmission line

53
Striplines and Microstrip Lines

a microstrip line suspended in air can support
TEM wave
a microstrip line printed on a grounded slab does
not support TEM wave
the exact fields constitute a hybrid TM-TE wave
when the dielectric slab become very thin
(electrically), most of the electric fields are
trapped under the microstrip line and the fields
are essentially the same as those of the static
case, the fields are quasi-static

54
Striplines and Microstrip Lines

one can define an effective dielectric constant
so that the phase velocity and the propagation
constant can be defined as
the effective dielectric constant is bounded by
, it also depends on the
slab thickness d and conductor width, W

55
Design Formulas of Microstrip Lines

design formulas have been derived for microstrip
lines
these formulas yield approximate values which are
accurate enough for most applications
they are obtained from analytical expressions for
similar structures that are solvable exactly and
are modified accordingly

56
Design Formulas of Microstrip Lines

or they are obtained by curve fitting numerical
data
the effective dielectric constant of a microstrip
line is given by

57
Design Formulas of Microstrip Lines

the characteristic impedance is given by
for W/d 1
For W/d 1

58
Design Formulas of Microstrip Lines

for a given characteristic impedance and
dielectric constant , the W/d ratio can be
found as
for
W/dlt2

59
Design Formulas of Microstrip Lines

for W/d gt 2
Where
And

60
Design Formulas of Microstrip Lines

for a homogeneous medium with a complex
dielectric constant, the propagation constant is
written as
note that the loss tangent is usually very small

61
Design Formulas of Microstrip Lines

Note that where x is
small
therefore, we have

62
Design Formulas of Microstrip Lines

Note that
for small loss, the phase constant is unchanged
when compared to the lossless case
the attenuation constant due to dielectric loss
is therefore given by
Np/m (TE or TM) (55)

63
Design Formulas of Microstrip Lines

For TEM wave , therefore
Np/m (TEM) (56)
for a microstrip line that has inhomogeneous
medium, we multiply Eq. (56) with a filling
factor

64
Design Formulas of Microstrip Lines

(57)
the attenuation due to conductor loss is given by
(58) Np/m where
is called the surface resistance of the
conductor

65
Design Formulas of Microstrip Lines

note that for most microstrip substrate, the
dielectric loss is much more significant than the
conductor loss
at very high frequency, conductor loss becomes
significant

66
An Approximate Electrostatic Solution for
Microstrip Lines

two side walls are sufficiently far away that the
quasi-static field around the microstrip would
not be disturbed (a gtgt d)

67
An Approximate Electrostatic Solution for
Microstrip Lines

we need to solve the Laplaces equation with
boundary conditions
two expressions are needed, one for each region

68
An Approximate Electrostatic Solution for
Microstrip Lines

using the separation of variables and appropriate
boundary conditions, we write

69
An Approximate Electrostatic Solution for
Microstrip Lines

the potential must be continuous at yd so that
note that this expression must be true for any
value of n

70
An Approximate Electrostatic Solution for
Microstrip Lines

due to fact that
if m is not equal to n

71
An Approximate Electrostatic Solution for
Microstrip Lines

the normal component of the electric field is
discontinuous due to the presence of surface
charge on the microstrip,

72
An Approximate Electrostatic Solution for
Microstrip Lines

the surface charge at yd is given by
assuming that the charge distribution is given by
on the conductor and zero elsewhere

multiply Eq. (63) by cos mpx/a and integrate from
-a/2 to a/2, we have

74
An Approximate Electrostatic Solution for
Microstrip Lines

the voltage of the microstrip wrt the ground
plane is
the total charge on the strip is

75
An Approximate Electrostatic Solution for
Microstrip Lines

the static capacitance per unit length is
this is the expression for

76
An Approximate Electrostatic Solution for
Microstrip Lines

the effective dielectric is defined as
, where is obtained from
Eq. (64) with
the characteristic impedance is given by

77
The Transverse Resonance Techniques

the transverse resonance technique employs a
transmission line model of the transverse cross
section of the guide
right at cutoff, the propagation constant is
equal to zero, therefore, wave cannot propagate
in the z direction

78
The Transverse Resonance Techniques

it forms standing waves in the transverse plane
of the guide
the sum of the input impedance at any point
looking to either side of the transmission line
model in the transverse plane must be equal to
zero at resonance

79
The Transverse Resonance Techniques

consider a grounded slab and its equivalent
transmission line model

80
The Transverse Resonance Techniques

the characteristic impedance in each of the air
and dielectric regions is given by
and
since the transmission line above the dielectric
is of infinite extent, the input impedance
looking upward at xd is simply given by

81
The Transverse Resonance Techniques

the impedance looking downward is the impedance
of a short circuit at x0 transfers to xd
Subtituting
, we have
Therefore,

82
The Transverse Resonance Techniques

Note that , therefore, we have
From phase matching,
which leads to
Eqs. (65) and (66) are identical to that of Eq.
(38) and (39)

83
Wave Velocities and Dispersion

a plane wave propagates in a medium at the speed
of light
Phase velocity, , is the speed
at which a constant phase point travels
for a TEM wave, the phase velocity equals to the
speed of light
if the phase velocity and the attenuation of a
transmission line are independent of frequency, a
signal propagates down the line will not be
distorted

84
Wave Velocities and Dispersion

if the signal contains a band of frequencies,
each frequency will travel at a different phase
velocity in a non-TEM line, the signal will be
distorted
this effect is called the dispersion effect

85
Wave Velocities and Dispersion

if the dispersion is not too severe, a group
velocity describing the speed of the signal can
be defined
let us consider a transmission with a transfer
function of

86
Wave Velocities and Dispersion

if we denote the Fourier transform of a
time-domain signal f(t) by F(w), the output
signal at the other end of the line is given by
if A is a constant and y aw, the output will be

87
Wave Velocities and Dispersion

this expression states that the output signal is
A times the input signal with a delay of a
now consider an amplitude modulated carrier wave
of frequency

88
Wave Velocities and Dispersion

the Fourier transform of
is given by
note that the Fourier transform of s(t) is equal
to

89
Wave Velocities and Dispersion

The output signal , is given by
for a dispersive transmission line, the
propagation constant b depends on frequency, here
A is assume to be constant (weakly depend on w)

90
Wave Velocities and Dispersion

if the maximum frequency component of the signal
is much less than the carrier frequencies, b can
be linearized using a Taylor series expansion
note that the higher terms are ignored as the
higher order derivatives goes to zero faster than
the growth of the higher power of

91
Wave Velocities and Dispersion