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1
BASIC ANTENNA PARAMETERS
Presentation Outline Introduction Reflection Coefficient Impedance bandwidth Radiation patterns Field Regions Beamwidth Directivity Antenna Efficiency Antenna Gain Polarization
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3
Introduction
Antenna parameters: describe the performance of an antenna
Definitions of the various parameters are necessary, and some are interrelated.
Most parameters are derived from: Complex radiation pattern Gain (or efficiency) Impedance (or scattering parameters)
IEEE Standard Definitions of Terms for Antennas (IEEE Std 145 – 1983)
Reflection Coefficient
Ratio of the reflected voltage amplitude vs the forward voltage amplitude
4
0
0
ZZ
ZZ
V
V
L
L
5
Impedance Bandwidth A range of frequencies, within which the antenna
characteristics (input impedance) conforms to certain specifications (e.g. |Γ| = -10 dB):
For narrowband antennas, the FBW is expressed as a percentage of the frequency difference over the center frequency:
min
max
f
fFBW
%1000
minmax
f
ffFBW
2minmax0 fff minmax0 fff
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Radiation Pattern Defined as “a mathematical function or a graphical
representation of the radiation properties of the antenna as a function of space coordinates.
Is determined in the far-field region.
Represented as a function of the directional coordinates.
Radiation properties include power flux density, radiation intensity, field strength, directivity, phase or polarization.”
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Field Regions
Figure 1.11: Field regions of an antenna.
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Field Regions Reactive near-field region is defined as “that portion of
the near-field region immediately surrounding the antenna wherein the reactive field predominates”.
where λ is the wavelength
D is the largest dimension of the antenna
For a very short dipole (or equivalent radiator) the outer boundary is commonly taken to exist at a distance λ/2π from the antenna surface.
[1.10]
3
62.0D
R
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Field Regions Radiating near-field region (Fresnel) is defined as “that
region of the field of an antenna between the reactive near-field region and the far-field region wherein radiation fields predominate and wherein the angular field distribution is dependent upon the distance from the antenna”.
where λ is the wavelength
D is the largest dimension of the antenna
If antenna has a dimension that is not large compared to wavelength, this region may not exist.
23 262.0
DR
D [1.11]
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Field Regions Far-field region (Fraunhofer) is defined as “that region
of the field of an antenna where the angular field distribution is essentially independent of the distance from the antenna”.
where λ is the wavelength
D is the largest dimension of the antenna
The far-field patterns of certain antennas, such as multibeam reflector antennas are sensitive to variations in phase over their apertures.
22DR [1.12]
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Field Regions
Typical changes of antenna amplitude pattern shape from reactive near field toward the far field.
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Radiation Pattern: TypesTypes of Radiation Patterns:
Power pattern: the trace of the angular variation of the received/radiated power at a constant radius from the antenna
Amplitude field pattern: the trace of the spatial variation of the magnitude of electric (magnetic) field at a constant radius from the antenna.
Often the field and power pattern are normalized with respect to their maximum value, yielding normalized field and power patterns.
The power pattern is usually plotted on a logarithmic scale or more commonly in decibels (dB).
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Radiation Pattern: Types For an antenna, the
Field pattern (in linear scale) typically represents a plot of the magnitude of the electric or magnetic field as a function of the angular space.
Power pattern (in linear scale) typically represents a plot of the square of the magnitude of the electric or magnetic field as a function of the angular space.
Power pattern (in dB) represents the magnitude of the electric or magnetic field, in decibels, as a function of the angular space.
Note: the power pattern and the amplitude field pattern are the same when computed and plotted in dB.
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Radiation Pattern: Example
Figure 1.1: coordinate system for antenna analysis
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Radiation Pattern: Example 3D & 2D
Three and two dimensional power patterns (in linear scale)
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Radiation Pattern: Example 3D & 2D
3-D and 2-D patterns
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Plotting Radiation Patterns
Plotting the pattern
Example: Monopole
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Example: Yagi antenna
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Example: Dipole antenna
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Radiation Pattern Characteristics The plus (+) and the minus (-) signs in the lobes
indicate the relative polarization of the amplitude between the various lobes, which changes (alternates) as the nulls are crossed.
To find the points where the pattern achieves its half-power (-3 dB points), relative to the maximum value of the pattern: Field pattern at 0.707 value of its maximum. Power pattern (in linear scale) at its 0.5 value of
its maximum. Power pattern (in dB) at -3 dB value of its
maximum. The angular separation between the two half-power
points is referred to as HPBW.
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Radiation Pattern Characteristics
Two-dimensional normalized field pattern of a 10-element linear array with a spacing of d = 0.25λ
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Radiation Pattern Characteristics
Two-dimensional normalized field pattern of a 10-element linear array with a spacing of d = 0.25λ
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Beamwidth• Defined as the angular separation between two identical
points on opposite side of the pattern maximum.
• The Half-Power Beamwidth (HPBW): in a plane containing the direction of the maximum of a beam.
• First-Null Beamwidth (FNBW): the angular separation between the first nulls if the pattern. Often FNBW≈2 HPBW⋅
• Used as a trade-off between it and the side lobe level; as the beamwidth decreases, the side lobe increases and vice-versa.
• Used to describe the resolution capabilities of the antenna; to distinguish between two adjacent radiating sources and targets.
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Beamwidth
Pattern beamwidth.
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Radiation Pattern Lobes
Radiation lobes and beamwidths of an antenna pattern
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Radiation Pattern Lobes A major lobe (also called main beam) is defined as
“the radiation lobe containing the direction of maximum radiation”.
A minor lobe is any lobe except major lobe. represent radiation in undesired directions, and they should be minimized
A side lobe is “a radiation lobe in any direction other than intended lobe”. Normally adjacent to the main lobe and occupies the hemisphere in the direction of the main beam. Largest of the minor lobes.
A back lobe is “a radiation lobe whose axis makes an angle of approximately 180º with respect to the beam of the antenna”.
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Radiation Pattern Lobes
Figure 1.6: Linear plot of power pattern and its associated lobes and beamwidths.
29
Radiation Pattern Lobes
Figure 1.7: Normalized three-dimensional amplitude field pattern (in linear scale) of a 10-element linear array antenna with a uniform spacing of 0.25λ
and progressive phase shift (β = -0.6π) between the elements.
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Isotropic/Directional/Omnidirectional Patterns Isotropic pattern
is the pattern of an antenna having equal radiation in all directions.
This is an ideal (not physically achievable) concept. Used to define other antenna parameters. It is represented simply by a sphere whose center
coincides with the location of the isotropic radiator.
Directional antenna is an antenna, which radiates (receives) much more
efficiently in some directions than in others. Applies to antennas whose directivity is much higher
than that of a half wavelength dipole.
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Isotropic/Directional/Omnidirectional Patterns
Omnidirectional antenna is an antenna, which has a non-directional pattern in a
given plane, and a directional pattern in any orthogonal plane (e.g. single-wire antennas).
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Isotropic/Directional/Omnidirectional Patterns
Figure 1.8: Omnidirectional Antenna Pattern.
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Principal Patterns
Principal patterns are the 2-D patterns of linearly polarized antennas, measured in the E-plane (a plane parallel to the |Ē| vector and containing the direction of maximum radiation)
the H-plane (a plane parallel to the vector, orthogonal to the E-plane, and containing the direction of maximum radiation).
H
34
Principal Patterns
Figure 1.9: Principle E- and H-plane patterns for a pyramidal horn antenna.
35
Polarization The polarization of the wave can be defined in terms
of a wave radiated (transmitted) or received by an antenna in a given direction.
Polarization may be classified as linear, circular or elliptical.
If the vector that describes the electric field at a point in space as a function of time is always directed along a line, the field is said to be linearly polarized.
If the figure that the electric field traces is an ellipse, the field is said to be elliptically polarized.
Linear and circular polarizations are special cases of elliptical, and they can be obtained when the ellipse become a straight line or a circle, respectively.
36
Polarization
Types of polarization
37
Polarization Polarization of an antenna in a given direction is
defined as “the polarization of the wave transmitted (radiated) by the antenna. When the direction is not stated, the polarization is taken to be the polarization in the direction of maximum gain”.
Polarization of a radiated wave is defined as “that property of an electromagnetic wave describing the time varying direction and relative magnitude of the electric field vector.
Polarization is the curve traced by the end point of the arrow (vector) representing the instantaneous electric field. The field must be observed along the direction of propagation.
38
Polarization
Rotation of a plane electromagnetic wave and its polarization
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Polarization
Rotation of a plane electromagnetic wave and its polarization
40
Polarization At each point on the radiation sphere, the
polarization is usually resolved into a pair of orthogonal polarizations, the co-polarization and cross-polarization.
Co-polarization represents the polarization the antenna is intended to radiate (receive) while cross-polarization represents the polarization orthogonal to the co-polarization
Radiation Pattern Measurement
41
Radiation Pattern Measurement
42
Radiation Pattern Measurement
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Radiation Pattern Measurement
Calculated radiation patterns of a paraboloid antenna for different distances from the antenna.
45
Directivity• Defined as “the ratio of the radiation intensity in a given
direction from the antenna to the radiation intensity averaged over all directions.”
• “The average radiation intensity is equal to the total power radiated by the antenna divided by 4π.”
• If the direction is not specified, the direction of maximum radiation intensity is implied.”
• The directivity of a non-isotropic source is equal to the ratio of its radiation intensity in a given direction over that of an isotropic source.
radP
U
U
UD
4
0
46
Directivity• If the direction is not specified, it implies the direction of
maximum radiation intensity (maximum directivity) expressed as:
radP
U
U
U
U
UDD max
0
max
0
max0max
4 [1.28]
D = directivity (dimensionless)D0 = maximum directivity (dimensionless)U = radiation intensity (W / unit solid angle)Umax = maximum radiation intensity (W / unit solid angle)U0 = radiation intensity of isotropic source (W / unit solid angle)Prad = total radiated power (W)
47
Antenna Efficiency Total efficiency of an antenna et is used to estimate the
total loss of energy at the input terminals of the antenna and within the antenna structure.
Includes all mismatch losses and the dielectric/conduction losses (described by the radiation efficiency, e, as defined by the IEEE Standards)
The overall efficiency:
dcr eeee 0
e0 = total efficiency (dimensionless)er = reflection (missmatch) efficiency (dimensionless)ec = conduction efficiency (dimensionless)ed = dielectric efficiency (dimensionless)Γ = voltage reflection coefficient at the input terminals of the antenna.
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Antenna Efficiency
Reference terminals and losses of an antenna
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Antenna Gain• G is the ratio of the radiation intensity U in a given
direction and the radiation intensity that would be obtained, if the power fed to the antenna were radiated isotropically.
inP
UG
,4,
• Normally we deal with relative gain.• Defined as “the ratio of the power gain in a given direction
to the power gain of a reference antenna in its referenced direction”.
• The power input must be same for both antennas.
50
Antenna Gain The reference antenna usually a dipole, horn, or any
other antenna whose gain can be calculated or it is known.
When the direction is not stated, the power gain is usually taken in the direction of maximum radiation.
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Gain Measurement Popular: Gain comparison/substitution method
A standard gain antenna (with known gain) is used to calculate the gain of the antenna under test (AUT)
From the Friis Transmission equation:
2
4
RGG
P
Porot
t
r
52
Standard Gain Antennas
53
Gain Measurement Step 1: Measure the standard gain antenna
(SGH) as the AUT
Step 2: Measure the AUT
54
Gain Measurements
Step 3: Gain of AUT can be calculated using:
Note: Tx and AUT needs to be co-polarized AUT need to be placed in the far field
Extra Slides
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Radian & Steradian
• The measure of a plane angle is a radian.
• One radian is defined as the plane angle with its vertex at the center of a circle of radius r that is subtended by an arc whose length is r.
rC 2• There are 2π rad (2πr/r) in a full circle.
57
Radian & Steradian
• The measure of a solid angle is a steradian.
• One steradian is defined as the solid angle with its vertex at the center of a circle of a sphere radius r that is subtended by a spherical surface area equal to that of square which each side of a length r.
24 rA • There are 4π sr (4πr2/r2) in a closed sphere.
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Therefore, the element of solid angle dΩ of a sphere can be written as:
Radian & Steradian
ddrdA sin2
The infinitesimal area dA on the surface of a sphere of radius r, is given by:
ddr
dAd sin
2
(m2)
(sr)
59
Radian & Steradian
Geometrical arrangements for defining a radian and a steradian