Radar Measurements II

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Radar Measurements II

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Title: Radar Measurements II

1
Radar Measurements II
Chris Allen (callen_at_eecs.ku.edu) Course website
URL people.eecs.ku.edu/callen/725/EECS725.htm
2
Ground imaging radar

In a real-aperture system images of radar
backscattering are mapped into slant range, R,
and along-track position.
The along-track resolution, ?y, is provided
solely by the antenna. Consequently the
along-track resolution degrades as the distance
increases. (Antenna length, l, directly affects
along-track resolution.)
Cross-track ground range resolution, ?x, is
incidence angle dependent

where ?p is the compressed pulse duration
slant range
slant range
along-track direction
?y
?R
cross-track direction
ground range
ground range
?x
cross-track direction
?x
3
Slant range vs. ground range

Cross-track resolution in the ground plane (?x)
is theprojection of the range resolution from
the slant planeonto the ground plane.
At grazing angles (? ? 90), ?r ? ?x
At steep angles (? ? 0), ?x ? ?
For ? 5, ?x 11.5 ?r
For ? 15, ?x 3.86 ?r
For ? 25, ?x 2.37 ?r
For ? 35, ?x 1.74 ?r
For ? 45, ?x 1.41 ?r
For ? 55, ?x 1.22 ?r

4
Real-aperture, side-looking airborne radar (SLAR)
image of Puerto Rico
40 x 100 miles
Mosaicked image composed of 48-km (30-mile)
wide strip map imagesRadar parametersmodified
Motorola APS-94D systemX-band (3-cm
wavelength)altitude 8,230 m (above mean sea
level)azimuth resolution 10 to 15 m
Digital Elevation Model of Puerto Rico
5
Another SLAR image
5-m (18 feet) SLAR antenna mounted beneath
fuselage
SLAR image of river valley
SLAR operators console

X-band system
Civilian uses include
charting the extent of flood waters,
mapping, locating lost vessels,
charting ice floes,
locating archaeological sites,
seaborne pollution spill tracking,
various geophysical surveying chores.

6
Limitations of real-aperture systems

With real-aperture radar systems the azimuth
resolution depends on the antennas azimuth
beamwidth (?az) and the slant range, R
Consider the AN/APS 94 (X-band, 5-m antenna
length) ?az 6 mrad or 0.34?
For a pressurized jet aircraft
altitude of 30 kft (9.1 km) and an incidence
angle of 30? for a slant range of 10.5 km
R h/cos ? 9100 / cos 30? 10500 m
?y 63 m (coarse but useable)
Now consider a spaceborne X-band radar (15-m
antenna length) ?az 2 mrad or 0.11?
500-km altitude and a 30? incidence angle (27.6?
look angle) for a 570.5-km slant range
?y 1.1 km (very coarse)
The azimuth resolution of real-aperture radar
systems is very coarse for long-range applications

7
Radar equation for extended targets

Since ?A ?x? ?y we have
Substituting these terms into the range equation
leads to
note the range dependence is now R-3 whereas for
a point target it is R-4 This is due to the fact
that a larger area is illuminated as R increases.

8
SNR and the radar equation

Now to consider the SNR we must use the noise
power
PN kT0BF
Assuming that terrain backscatter, ??, is the
desired signal (and not simply clutter), we get
Solving for the maximum range, Rmax, that will
yield the minimum acceptable SNR, SNRmin, gives

9
Radar altimetry

Altimeter a nadir-looking radar that precisely
measures the range to the terrain below. The
terrain height is derived from the radars
position.

10
Altimeter data
Radar map of the contiguous 48 states.
11
Altimeter
12
TOPEX/Poseidon

A - MMS multimission platform B - Instrument
module   1/Data transmission TDRS    2/Global
positioning system antenna   3/Solar array
   4/Microwave radiometer   5/Altimeter
antenna   6/Laser retroreflectors   7/DORIS
antenna
Dual frequency altimeter (5.3 and 13.6 GHz)
operating simultaneously.
Three-channel radiometer (18, 21, 37 GHz)
provides water vapor data beneath satellite
(removes 1 cm uncertainty).
2-cm altimeter accuracy100 million echoes each
day10 MB of data collected per day

French-American systemLaunched in 199210-day
revisit period (66? orbit inclination)Altitude
1336 kmMass 2400 kg
13
Altimeter data
Global topographic map of ocean surface produced
with satellite altimeter.
14
Altimeter data
15
Mars Orbiter Laser Altimeter (MOLA)

Laser altimeter (not RF or microwave)
Launched November 7, 1996
Entered Mars orbit on September 12, 1997
Selected specifications
282-THz operating frequency (1064-nm wavelength)
10-Hz PRF
48-mJ pulse energy
50-cm diameter antenna aperture (mirror)
130-m spot diameter on surface
37.5-cm range measurement resolution

16
Mars Orbiter Laser Altimeter (MOLA)
17
Radar altimetry

The echo shape, E(t), of altimetry data is
affected by the radars point target response,
p(t), its flat surface response, S(t), which
includes gain and backscatter variations with
incidence angle, and the rms surface height
variations, h(t).
Analysis of the echo shape, E(t), can provide
insight regarding the surface. From the echos
leading we learn about the surface height
variations, h(t), and from its trailing edge we
learn about the backscattering characteristics,
??(?).

18
Signal integration

Combining consecutive echo signals can improve
the signal-to-noise ratio (SNR) and hence improve
the measurement accuracy, or it can improve our
estimate of the SNR and hence improve our
measurement precision.
Two basic schemes for combining echo signals in
the slow-time dimension will be addressed.
Coherent integration
Incoherent integration
Coherent integration (also called presumming or
stacking) involves working with signals
containing magnitude and phase information
(complex or I Q values, voltages, or simply
signals that include both positive and negative
excursions)
Incoherent integration involves working with
signals that have been detected (absolute values,
squared values, power, values that are always
positive)
Both operations involve operations on values
expressed in linear formats and not expressed in
dB.

19
Coherent integration

Coherent integration involves the summation or
averaging of multiple echo signal records (Ncoh)
along the slow-time dimension.
Coherent integration is commonly performed in
real time during radar operation.

Coherent integration affects multiple radar
parameters.
It reduces the data volume (or data rate) by
Ncoh.
It improves the SNR of in-band signals by Ncoh.
It acts as a low-pass filter attenuating
out-of-band signals.

20
Coherent integration
21
Coherent integration
22
Coherent integration

Signal power found using
where vs is the signal voltage vector
Noise power found using
where vsn is the signal noise voltage vector
SNR is then
note that std_dev2 is variance

23
Coherent integration

Summing Ncoh noisy echoes has the following
effect
Signal amplitude is increased by Ncoh
Signal power is increased by (Ncoh)2
Noise power is increased by Ncoh
Therefore the SNR is increased by Ncoh
Noise is uncorrelated and therefore only the
noise power adds whereas the signal is correlated
and therefore its amplitude adds. This is the
power behind coherent integration.
Averaging Ncoh noisy echoes has the following
effect
Signal amplitude is unchanged
Signal power is unchanged
Noise power is decreased by Ncoh
Therefore the SNR is increased by Ncoh
Noise is uncorrelated and has a zero mean value.
Averaging Ncoh samples of random noise reduces
its variance by Ncoh and hence the noise power is
reduced.

24
Coherent integration

Underlying assumptions essential to benefit from
coherent integration.
Noise must be uncorrelated pulse to pulse.
Coherent noise (such as interference) does not
satisfy this requirement.
Signal must be correlated pulse to pulse.
That is, for maximum benefit the echo signals
phase should vary by less than 90? over the
entire integration interval.
For a stationary target relative to the radar,
this is readily achieved.
For a target moving relative to the radar, the
maximum integration interval is limited by the
Doppler frequency. This requires a PRF much
higher than PRFmin, that is the Doppler signal is
significantly oversampled.

Ncoh 10
25
Coherent integration

Coherent integration filters data in slow-time
dimension.
Filter characterized by its transfer function.

26
Coherent integration

Impact on SNR
Coherent integration improves the SNR by Ncoh.
For point targets
For extended targets

SNRvid
SNRcoh
27
Coherent integration

So what is going on to improve the SNR ?
Is the receiver bandwidth being reduced ? No
By coherently adding echo signal energy from
consecutive pulses we are effectively increasing
the illumination energy.
This may be thought of as increasing the
transmitted power, Pt.
Again returning to the ACR 430 airfield-control
radar example
The transmitter has peak output power, Pt, of 55
kW and a pulse duration, ?, of 100 ns, (i.e., B
10 MHz).
Hence the transmit pulse energy is Pt ?? 5.5 mJ
Coherently integrating echoes from 10 pulses
(Ncoh 10) produces an SNR equivalent to the
case where Pt is 10 times greater, i.e., 550 kW
and the total illumination energy is 55 mJ.
Alternatively, coherent integration permits a
reduction of the transmit pulse power, Pt,
equivalent to the Ncoh while retaining a constant
SNR.

28
Incoherent integration

Incoherent detection is similar to coherent
detection in that it involves the summation or
averaging of multiple echo signal records (Ninc)
along the slow-time dimension.
Prior to integration the signals are detected
(absolute values, squared values, power, values
that are always positive).
Consequently the statistics describing the
process is significantly more complicated (and
beyond the scope of this class).
The improvement in signal-to-noise ratio due to
incoherent integration varies between ? Ninc and
Ninc, depending on a variety of parameters
including detection process and Ninc.
How it works For a stable target signal, the
signal power is fairly constant while the noise
power fluctuates. Therefore integration
consistently builds up the signal return whereas
the variability of the noise power is reduced.
Consequently the detectability of the signal is
improved.

29
Incoherent integration

Example using square-law detection

30
More on coherent integration

Clearly coherent integration offers tremendous
SNR improvement.
To realize the full benefits of coherent
integration the underlying assumptions must be
satisfied
Noise must be uncorrelated pulse to pulse
Signal phase varies less than 90? over
integration interval
The second assumption limits the integration
interval for cases involving targets moving
relative to the radar.
Coherent integration can be used if phase
variation is removed first.
Processes involved include range migration and
focusing.
For a 2.25-kHz PRF, Ncoh 100,000 or 50 dB of
SNR improvement

31
Tracking radar (ch 3)

In this application the radar continuously
monitors the targets range and angular position
(angle-of-arrival AOA).
Tracking requires fine angular position
knowledge, unlike the search radar application
where the angular resolution was ?el and ?az.
Improved angle information requires additional
information from the antenna.
Monopulse radar
With monopulse radar, angular position
measurements are accomplished with a single pulse
(hence the name monopulse).
This system relies on a more complicated antenna
system that employs multiple radiation patterns
simultaneously.
There are two common monopulse varieties
amplitude-comparison monopulse
phase-comparison monopulse
Each variety requires two (or more) antennas and
thus two (or more) receive channels

32
Amplitude-comparison monopulse

This concept involves two co-located antennas
with slightly shifted pointing directions.
The signals output from the two antennas are
combined in two different processes
? (sum) output is formed by summing the two
antenna signals
? (difference) output is formed by subtracting
signals from one another
These combinations of the antenna signals produce
corresponding radiation patterns (? and ?) that
have distinctly different characteristics
?/? (computed in signal processor) provides an
amplitude-independent estimate of the variable
related to the angle

33
Phase-comparison monopulse

This concept involves two antennas separated by a
small distance d with parallel pointing
directions.
The received signals are compared to produce a
phase difference, ??, that yields
angle-of-arrival information.
For small ?, sin ? ? ?

34
Dual-axis monopulse

Both amplitude-comparison and phase-comparison
approaches provide angle-of-arrival estimates in
one-axis.
For dual-axis angle-of-arrival estimation,
duplicate monopulse systems are required aligned
on orthogonal axes.

35
Dual-axis monopulse
36
Monopulse

Conventional monopulse processing to obtain the
angle-of-arrival is valid for only one point
target in the beam, otherwise the angle
estimation is corrupted.
Other more complex concepts exist for
manipulating the antennas spatial coverage.
Theses exploit the availability of signals from
spatially diverse antennas (phase centers).
Rather than combining these signals in the RF or
analog domain, these signals are preserved into
the digital domain where various antenna patterns
can be realized via digital beamforming.

37
Frequency agility

Frequency agility involves changing the radars
operating frequency on a pulse-to-pulse basis.
(akin to frequency hopping in some wireless
communication schemes)
Advantages
Improved angle estimates (refer to text for
details)
Reduced multipath effects
Less susceptibility to electronic countermeasures
Reduced probability detection, low probability of
intercept (LPI)
Disadvantages
Scrambles the target phase information
Changing f changes ?
To undo the effects of changes in f requires
precise knowledge of R
Pulse-to-pulse frequency agility is typically not
used in coherent radar systems.

38
Pulse compression

Pulse compression is a very powerful concept or
technique permitting the transmission of
long-duration pulses while achieving fine range
resolution.

39
Pulse compression

Pulse compression is a very powerful concept or
technique permitting the transmission of
long-duration pulses while achieving fine range
resolution.
Conventional wisdom says that to obtain fine
range resolution, a short pulse duration is
needed.
However this limits the amount of energy (not
power) illuminating the target, a key radar
performance parameter.
Energy, E, is related to the transmitted power,
Pt by
Therefore for a fixed transmit power, Pt, (e.g.,
100 W), reducing the pulse duration, ?, reduces
the energy E.
Pt 100 W, ? 100 ns ? ?R 50 ft, E 10 ?J
Pt 100 W, ? 2 ns ? ?R 1 ft, E 0.2
?J
Consequently, to keep E constant, as ? is
reduced, Pt must increase.

40
More Tx Power??

Why not just get a transmitter that outputs more
power?
High-power transmitters present problems
Require high-voltage power supplies (kV)
Reliability problems
Safety issues (both from electrocution and
irradiation)
Bigger, heavier, costlier,

41
Simplified view of pulse compression

Energy content of long-duration, low-power pulse
will be comparable to that of the short-duration,
high-power pulse
?1 ?2 and P1 P2

42
Pulse compression

Radar range resolution depends on the bandwidth
of the received signal.
The bandwidth of a time-gated sinusoid is
inversely proportional to the pulse duration.
So short pulses are better for range resolution
Received signal strength is proportional to the
pulse duration.
So long pulses are better for signal reception
Solution Transmit a long-duration pulse that has
a bandwidth corresponding to that of a
short-duration pulse

c speed of light, ?R range resolution, ?
pulse duration, B signal bandwidth
43
Pulse compression, the compromise

Transmitting a long-duration pulse with a wide
bandwidth requires modulation or coding the
transmitted pulse
to have sufficient bandwidth, B
can be processed to provide the desired range
resolution, ?R
Example
Desired resolution, ?R 15 cm ( 6) Required
bandwidth, B 1 GHz (109 Hz)
Required pulse energy, E 1 mJ E(J)
Pt(W) ?(s)
Brute force approach
Raw pulse duration, ? 1 ns (10-9 s)
Required transmitter power, Pt 1 MW !
Pulse compression approach
Pulse duration, ? 0.1 ms (10-4 s)
Required transmitter power, Pt 10 W

44
Pulse coding

The long-duration pulse is coded to have desired
bandwidth.
There are various ways to code pulse.
Phase code short segments
Each segment duration 1 ns
Linear frequency modulation (chirp)
for 0 ? t ? ?
fC is the starting frequency (Hz)
k is the chirp rate (Hz/s)
B k? 1 GHz
Choice driven largely by required complexity of
receiver electronics

1 ns
t
45
Phase coded waveform
46
Analog signal processing
47
Binary phase coding
48
Receiver signal processingphase-coded pulse
compression
time
Correlation process may be performed in the
analog or digital domain. A disadvantage of this
approach is that the data acquisition system (A/D
converter) must operate at the full system
bandwidth (e.g., 1 GHz in our example). PSL
peak sidelobe level (refers to time sidelobes)
49
Binary phase coding

Various coding schemes
Barker codes
Low sidelobe level
Limited to modest lengths
Golay (complementary) codes
Code pairs sidelobes cancel
Psuedo-random / maximal length sequential codes
Easily generated
Very long codes available
Doppler frequency shifts and imperfect modulation
(amplitude and phase) degrade performance

50
Chirp waveforms and FM-CW radar

To understand chirp waveforms and the associated
signal processing, it is useful to first
introduce the FM-CW radar.
FM frequency modulation
CW continuous wave
This is not a pulsed radar, instead the
transmitter operates continuously requiring the
receiver to operate during transmission.
Pulse radars are characterized by their duty
factor, D
where ? is the pulse duration and PRF is the
pulse repetition frequency.
For pulsed radars D may range from 1 to 20.
For CW radars D 100.

51
FM-CW radar

Simple FM-CW block diagram and associated signal
waveforms.

FM-CW radar block diagram
52
FM-CW radar

Linear FM sweep
Bandwidth B Repetition period TR 1/fm
Round-trip time to target T 2R/c
The beat frequency fb fTx fRx
The beat signal observation time is TR/2
providing a frequency resolution, ?f 2 fm
Therefore the range resolution ?R c/2B m

53
FM-CW radar

The FM-CW radar has the advantage of constantly
illuminating the target (complicating the radar
design).
It maps range into frequency and therefore
requires additional signal processing to
determine target range.
Targets moving relative to the radar will produce
a Doppler frequency shift further complicating
the processing.

54
Chirp radar

Blending the ideas of pulsed radar with linear
frequency modulation results in a chirp (or
linear FM) radar.
Transmit a long-duration, FM pulse.
Correlate the received signal with a linear FM
waveform to produce range dependent target
frequencies.
Signal processing (pulse compression) converts
frequency into range.
Key parameters
B, chirp bandwidth
?, Tx pulse duration

55
Chirp radar

Linear frequency modulation (chirp) waveform
for 0 ? t ? ?
fC is the starting frequency (Hz)
k is the chirp rate (Hz/s)
?C is the starting phase (rad)
B is the chirp bandwidth, B k?

56
Receiver signal processingchirp generation and
compression
Dispersive delay line is a SAW device SAW
surface acoustic wave
57
Stretch chirp processing
58
Challenges with stretch processing
To dechirp the signal from extended targets, a
local oscillator (LO) chirp with a much greater
bandwidth is required. Performing analog dechirp
operation relaxes requirement on A/D converter.
Echoes from targets at various ranges have
different start times with constant pulse
duration. Makes signal processing more
difficult.
LO
near
Tx
B
Rx
near
time
frequency
frequency
far
far
time
59
Pulse compression example

Key system parametersPt 10 W, ? 100 ?s, B
1 GHz, E 1 mJ , ?R 15 cm
Derived system parametersk 1 GHz / 100 ?s 10
MHz / ?s 1013 s-2Echo duration, ? 100
?sFrequency resolution, ?f (observation
time)-1 10 kHz
Range to first target, R1 150 mT1 2 R1 / c
1 ?sBeat frequency, fb k T1 10 MHz
Range to second target, R2 150.15 mT2 2 R2 /
c 1.001 ?sBeat frequency, fb k T2 10.01
MHz
fb2 fb1 10 kHz which is the resolution of the
frequency measurement

60
Pulse compression example (cont.)

With stretch processing a reduced video signal
bandwidth is output from the analog portion of
the radar receiver.
video bandwidth, Bvid k Tp where Tp 2 Wr /c
and Wr is the swaths slant range width
for Wr 3 km, Tp 20 ?s ? Bvid 200 MHz
This relaxes the requirements on the data
acquisition system (i.e., analog-to-digital (A/D)
converter and associated memory systems).
Without stretch processing the data acquisition
system must sample a 1-GHz signal bandwidth
requiring a sampling frequency of 2 GHz and
memory access times less than 500 ps.

61
Correlation processing of chirp signals

Avoids problems associated with stretch
processing
Involves time-domain cross correlation of
received signal with reference signal. Matlab
command c,lag xcorr(a,b)
Time-domain cross correlation can be a slow,
compute-intensive process.
Alternatively we can take advantage of fact that
convolution in time domain equivalent to
multiplication in frequency domain
Convert received signal to freq domain (FFT)
Multiply with freq domain version of reference
chirp function
Convert product back to time domain (IFFT)

62
Signal correlation examples
Input waveform 1 High-SNR gated sinusoid, no
delay Input waveform 2 High-SNR
gated sinusoid, 800 count delay
63
Signal correlation examples
Input waveform 1 High-SNR gated sinusoid, no
delay Input waveform 2 Low-SNR
gated sinusoid, 800 count delay
64
Signal correlation examples
Input waveform 1 High-SNR gated chirp, no
delay Input waveform 2 High-SNR
gated chirp, 800 count delay
65
Signal correlation examples
Input waveform 1 High-SNR gated chirp, no
delay Input waveform 2 Low-SNR
gated chirp, 800 count delay
66
Chirp pulse compression and time sidelobes
Peak sidelobe level can be controlled by
introducing a weighting function -- however this
has side effects.
67
Superposition and multiple targets

Signals from multiple targets do not interfere
with one another. (negligible coupling between
scatterers)
Free-space propagation, target interaction, radar
receiver all have linear transfer functions ?
superposition applies.
Signal from each target adds linearly with
signals from other targets.

?r is range resolution
68
Why time sidelobes are a problem

Sidelobes from large-RCS targets with can obscure
signals from nearby smaller-RCS targets.
Related to pulse duration, ?, is the temporal
extent of time sidelobes, 2?.
Time sidelobe amplitude is related to the overall
waveform shape.

69
Window functions and their effects
Time sidelobes are a side effect of pulse
compression. Windowing the signal prior to
frequency analysis helps reduce the effect. Some
common weighting functions and key characteristics
Less common window functions used in radar
applications and their key characteristics
70
Window functions
Basic function
a and b are the 6-dB and -? normalized bandwidths
71
Window functions
72
Detailed example of chirp pulse compression
received signal
dechirp analysis
which simplifies to
sinusoidal term
chirp-squared term
quadratic frequency dependence
linear frequency dependence
phase terms
sinusoidal term
after lowpass filtering to reject harmonics
73
Pulse compression effects on SNR and blind range

SNR improvement due to pulse compression is the
waveforms time-bandwidth product B?
(regardless of pulse compression scheme used)
Case 1 Pt 1 MW, ? 1 ns, B 1 GHz, E 1 mJ,
?R 15 cm
For a given R, Gt, Gr, l, s SNRvideo 10 dB
B? 1 or 0 dB
SNRcompress SNRvideo 10 dB
Blind range c?/2 0.15 m
Case 2 Pt 10 W, ? 100 ?s, B 1 GHz, E 1
mJ , ?R 15 cm
For the same R, Gt, Gr, l, s SNRvideo 40 dB
B? 100,000 or 50 dB
SNRcompress 10 dB
Blind range c?/2 15 km

(point target range equation)
74
Pulse compression

Pulse compression allows us to use a reduced
transmitter power and still achieve the desired
range resolution.
The costs of applying pulse compression include
added transmitter and receiver complexity
must contend with time sidelobes
increased blind range
The advantages generally outweigh the
disadvantages so pulse compression is used widely.

75
Radar range equation (revisited)

We now integrate the signal-to-noise ratio
improvement factors from coherent and incoherent
integration as well as pulse compression into the
radar range equation for point and distributed
targets.
Point targets
Extended targets

76
Dynamic range example

The SNR improvements discussed (coherent and
incoherent integration, pulse compression) also
expand the radars dynamic range.
In modern radars these SNR improvements occur in
the digital domain. Consequently the overall
dynamic range is not limited by the ADC.
To illustrate this fact consider the following
example.
A radar uses a Linear Technologies LT2255 ADC
Specs 14-bit, 125 MS/s, 1-V full scale, 640-MHz
analog bandwidth
It samples at 112 MHz (fs) a signal centered at
195 MHz with 30 MHz of bandwidth.
At 200 MHz the ADCs SNR is 70 dB (per the
product specifications) indicating an effective
number of bits, ENOB 11.7.
1 Vpp ? 10 dBm in a 50-? system
To realize the SNR improvement offered by
coherent integration, the thermal noise power
must be 3 to 5 dB above the ADCs quantization
noise floor.

77
Dynamic range example

Radar center frequency is 195 MHz.
Radar bandwidth is 30 MHz.
Radar spectrum extends from 180 MHz to 210 MHz.
Sampling frequency is 112 MHz.
Satisfies the Nyquist-Shannon requirement since
fs 112 MHz gt 60 MHz
Undersampling is used, therefore analysis is
required to ensure signal is centered within a
Nyquist zone.

78
Dynamic range example

The radar system has a 10-kHz PRF, a 10-?s ? with
30-MHz bandwidth, and performs 32 presums
(coherent integrations) prior to data recording.
During post processing pulse compression is
applied followed by an additional 128 coherent
integrations are performed (following phase
corrections or focusing).
These processing steps have the following effects
Signal Noise Dynamic power power rangeADC 10
dBm -55 dBm 65 dB
presum Ncoh 32 30 dB 15 dB 15 dB
pulse compression, B? 300 25 dB 0 dB 25 dB
coherent integration Ncoh 128 42 dB 21 dB 21
dB
Overall 107 dBm -19 dBm 126 dB
Thus the radar system has an instantaneous
dynamic range of 126 dB despite the fact that the
ADC has a 65-dB dynamic range.

79
Dynamic range example
Level set by adjusting receiver gain
80
0/? modulation

Coherent noise limits the SNR improvement offered
by coherent integration.
Using interpulse binary phase modulation (which
is removed by the ADC), the SNR improvement range
can be improved significantly.
On alternating transmit pulses, the phase of the
Tx waveform is shifted by 0 or ? radians.
Once digitized by the ADC, the phase applied to
the Tx waveform is removed (by toggling the sign
bit), effectively removing the interpulse phase
modulation and permitting presumming to proceed.
This scheme is particularly useful in suppressing
coherent signals originating within the radar.
Interpulse phase modulation can also be used to
extend the ambiguous range.

waveform ?waveform waveform ?waveform
81
0/? modulation

Graphical illustration of 0/? interpulse phase
modulation to suppress coherent interference
signals.

waveform ?waveform waveform ?waveform
int int int int
waveform waveform waveform waveform
int ?int int ?int
Coherent integration produces
waveform int waveform
?int waveform int waveform ?int
4 waveform
82
0/? modulation

Measured noise suppression as a function of the
number of coherent averages both with and without
0/? interpulse phase modulation.

83
FM-CW radar

Now we revisit the FM-CW radar to better
understand its advantages and limitations.
CW ? on continuously (never off) ? Tx while Rx
Tx signal leaking into Rx limits the dynamic range

OR
84
FM-CW radar

Circulator case (in on port 1 ? out on port 2,
in on port 2 ? out on port 3)
Leakage through circulator, port 1 ? port
3isolation maybe as good as 40 dB
Reflection of Tx signal from antenna back into
Rxgood antenna has S11 lt -10 dB
Separate antenna case
Antenna coupling lt - 50 dBisolation enhancements
(absorber material, geometry)
Leakage signal must not saturate Rx

85
FM-CW radar

FM frequency modulated
Frequency modulation required to provide range
information
Unmodulated CW radar
No range information provided, only Doppler
Useful as a motion detector or speed monitor
Leakage signal will have no Doppler shift (0 Hz),
easy to reject the DC component by placing a
high-pass filter after the mixer
FM-CW radar applications
Short-range sensing or probing
A pulsed system would require a very short pulse
duration to avoid the blind range
Altimeter systems
Nadir looking, only one large target of interest
FM-CW radar shortcomings
Signals from multiple targets may interact in the
mixer producing multiple false targets (if mixing
process is not extremely linear)

86
FM-CW radar

Design considerations
Range resolution, ?R c/(2 B) m
Frequency resolution, ?f 2/TR Hz
Noise power, PN k T0 B F W
But the bandwidth is the frequency resolution,
?f, so
PN k T0 ?f F W
Example snow penetrating FM-CW radar

87
FM-CW radar

Example snow penetrating FM-CW radar
B 2000 500 MHz 1500 MHz ? ?R 10 cm
Frequency resolution, ?f 1/sweep time 1/4 ms
250 Hz
PN -140 dBm
Rx gain 70 dB
PN out -140 dBm 70 dB -70 dBm
ADC saturation power 4 dBm
Rx dynamic range, 4 dBm (-70 dBm) 74 dB
Consistent with the ADCs 72-dB dynamic range
FM slope (like the chirp rate, k), 1500 MHz/4 ms
375 MHz/ms
So for target 1 at 17-m range, t 2R1/c 113
ns
Beat frequency, fb 113 ns ? 375 MHz/ms 42.5
kHz
fb - ?f 42.25 kHz ? range to target 2, R2
16.9 m ? ?R 10 cm
Note 1500-MHz bandwidth, 42-kHz beat frequency

88
FM-CW radar block diagram
HPF
LPF
89
FM-CW radar RF circuitry 9 x 6.5 x 1 module
90
Measured radar data
Laboratory test data
Measured radar data from Summit, Greenland in
July 2005
91
Bistatic / multistatic radar

Bistatic radar
one transmitter, one receiver, separated by
baseline L, and
bistatic angle, ?, is greater than either
antennas beamwidth
OR
L/RT or L/RR gt 20
The three points (Tx, Rx, target)comprising the
bistatic geometryform the bistatic triangle that
lies inthe bistatic plane.
Multistatic radar
more than one transmitter or receiver separated

92
Bistatic / multistatic radar

Why use a bistatic or multistatic configuration?
Covert operation
no Tx signal to give away position or activity
Exploit bistatic scattering characteristics
forward scatter backscatter
Passive radar or hitchhiker
exploit transmitters of opportunity to save cost
example transmitters include other radars, TV,
radio, comm satellites, GPS, lightning, the Sun
Counter ARM (ARM anti-radiation missile)
missile that targets transmit antennas by homing
in on the source
Counter retrodirective jammers
high-gain jamming antenna directing jamming
signal toward the transmitter location
Counter stealth
some stealth techniques optimized to reduce
backscatter, not forward scatter
Homing missile
transmitter on missile launcher, receiver on
missile (simplifies missile system)
Unique spatial coverage
received signal originates from intersection of
Tx and Rx antenna beams

93
Bistatic radar geometry

For a monostatic radar the range shell
representing points at equal range (isorange) at
an instant forms a sphere centered on the radars
antenna.
For a bistatic radar the isorange surface forms
an ellipse with the Tx and Rx antennas at the
foci.
That is, RT RR constant everywhere on the
ellipses surface.
Consequently, echoes from targets that lie on the
ellipse have the same time-of-arrival and cannot
be resolved based on range.

94
Bistatic range resolution

The bistatic range resolution depends on the
targets position relative to the bistatic
triangle.
For targets on the bistatic bisector the range
resolution is ?RB
For targets not on the bisectorthe range
resolution is ?R?
Therefore for target pairs on the ellipse, ?
90? and?R? ? ?, i.e., negligible range
resolution.
Note For the monostatic case, ? 0 and ?R
c?/2.

95
Bistatic Doppler

The Doppler frequency shift due to relative
motion in the bistatic radar geometry is found
using
For the case where both the transmitter and
receiver are stationarywhile the target is
moving, the Doppler frequency shift is
Note For the monostatic case, ? 0 and fd 2
VTGT cos (?)/?

96
Bistatic Doppler

For the case where both the transmitter and
receiver are moving while the target is
stationary, the Doppler frequency shift is
Another way to determine the Doppler shift for
the general case where the transmitter, receiver,
and target are moving is to numerically compute
the ranges (RT and RR) to the target position as
a function of time. Use numerical
differentiation to find dRT/dt and dRR/dt that
can then be used in
This approach can also be used to produce isodops
(contours of constant Doppler shift) on a surface
by numerically computing fB to each point on the
surface. Matlabs contour command is particularly
useful here.