final project part ii matlab session es 156 signals and systems 2007 seas prepared by frank tompkins
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Final Project Part IIMATLAB Session
ES 156 Signals and Systems 2007
SEAS
Prepared by Frank Tompkins
Outline
• freqz() command• Step by step through the communication
system– Explanation of new concepts and new
MATLAB functions– High-level view of flow through the system– Next week we talk in more detail about
implementation
• Eye diagrams
Start Early!
• Project is complex
• Not something you can do in one day
• Less hand-holding than MATLAB exercises in homework– More like real-life projects
• Extra office hours possible– Email us if you have questions/problems
freqz()
• Same inputs as filter()• Plots frequency response
• Outputs frequency response
channelFilterTaps = [1 0 -1/2 3/8 zeros(1,28)];
freqz(channelFilterTaps, 1);
channelFilterTaps = [1 0 -1/2 3/8 zeros(1,28)];
H = freqz(channelFilterTaps, 1, 256); % evaluate H(ej) at 256 points
Overall Idea
• Want to transmit a digital image from point A to point B using radio waves, etc.
• We won’t actually build antennas/wires– Simulate the whole thing in MATLAB
• Have to convert digital image to a wave that can travel through the air, a wire, etc. at point A
• Then convert wave back to a digital image at point B
• We’ll transmit DCTs instead of actual image pixels, as is often done in real life applications
• Image Pre-Processing– Break image into 8 pixel by 8 pixel blocks and
take DCT of each block– Quantize DCT coefficients into 256 levels by
representing them as 8-bit unsigned numbers
blkproc()
• MATLAB command for applying a function in blocks to a matrix
• Example: apply DCT in 8 by 8 blocks
I = imread(‘myimage.tif');
fun = @dct2;
J = blkproc(I, [8 8], fun);
Quantization
• Approximate a continuous range of values by a set of discrete values
Quantization
• In MATLAB uint8()
• For images, we have to scale to [0,1] before quantizing with im2uint8()
x = 5.7; % x is double precision (32-bit floating point)
xq = uint8(x); % xq is an 8-bit unsigned integer
xscaled = (1.4 - x) / (1.4 - 6.3); % x is an image matrix
xq = im2uint8(xscaled);
• Conversion to a bit stream– Using reshape()and permute()
• Arrange 8 x 8 DCT blocks into groups of N blocks each
• Reshape each block into a vector (length 8*8*N) to be transmitted later
• Convert each pixel in vector to a binary number
Conversion
reshape()
>> x = [1 2 3; 4 5 6; 7 8 9]'
x =
1 4 7
2 5 8
3 6 9
>> reshape(x,1,9)
ans =
1 2 3 4 5 6 7 8 9
• Takes elements columnwise
permute()>> x = rand(1,2,2)
x(:,:,1) =
0.4565 0.0185
x(:,:,2) =
0.8214 0.4447
>> permute(x,[2 1 3])
ans(:,:,1) =
0.4565
0.0185
ans(:,:,2) =
0.8214
0.4447
de2bi()>> x = [4; 212; 19]
x =
4
212
19
>> de2bi(x)
ans =
0 0 1 0 0 0 0 0
0 0 1 0 1 0 1 1
1 1 0 0 1 0 0 0
• Modulation– Modulate each bit by a sine wave and put into the channel– Implementation details are up to you
• What is written in the PDF file is a suggestion– We will however take off points if you use more than one for
loop in your code• That one should loop over the N-sized block groups to send
each one through the channel in turn
Pulse Amplitude Modulation
• PAM for short
• We will use a specific simple type:half-sine pulse
• To send a bit– For a 1 send sin(t)– For a 0 send –sin(t)
0 5 10 15 20 25 30-1
-0.5
0
0.5
1
t
0 5 10 15 20 25 30-1
-0.5
0
0.5
1
t
Modulated [1 0 0 1]
0 20 40 60 80 100 120 140-1
-0.8
-0.6
-0.4
-0.2
0
0.2
0.4
0.6
0.8
1
• Channel– Atmosphere, telephone wire, coaxial cable– We model it as an LTI system
• Impulse response h(t)
– In using MATLAB, must approximate by discrete time system h[n]
• Noise– We will use zero mean AWGN
• Additive White Gaussian Noise
– Add an independent Gaussian random variable to each sample passed through the channel
AWGN
noisePower = 2; % variance of Gaussian random variable
result = signalFromChannel + sqrt(noisePower) * randn(rows, cols);
>> randn(2,3)
ans =
-0.4326 0.1253 -1.1465
-1.6656 0.2877 1.1909
y[n] = h[n] * x[n] + noise[n]
[1 0 0 1] After Channel and Noise
0 20 40 60 80 100 120 140-3
-2
-1
0
1
2
3
• Receiver Equalization– Attempt to undo distortion of modulated signal
(sine wave) due to channel and noise– We will try two equalizing filters
• Zero Forcing (ZF)• Minimum Mean Square Error (MMSE)
Zero Forcing (ZF) Filter
• Just the inverse of the channel response• If H(ej) is the response of the channel, then the
ZF filter has response 1 / H(ej)• Clearly if there were no noise, ZF filter would
perfectly recover modulated signal• But since ZF doesn’t take noise into account at
all, it will perform very badly if noise is strong
MMSE Filter
• Takes noise into account
• Derived by minimizing the average error– We’ll just take it on faith
• If H(ej) is the response of the channel, then the MMSE filter has response
• Detection– Examine equalized signal to determine
whether a 1 or a 0 was sent over channel– Optimal detector is a thresholder
Threshold Detector
• Integrate (sum) the transmitted and equalized half-sine pulse
• If integral (sum) < 0, decide a 0 was sent
• Else decide a 1 was sent
• Conversion to an Image– After receiving all block groups, use reshape()and permute() to rebuild the block DCT image
Conversion to an Image
• Image Post-Processing– Use blkproc() to compute inverse block
DCT– That’s it!
Things To Play With
• Noise Power– Increasing noise power will cause more distortion in
received image
• ZF/MMSE Equalizers– Since MMSE handles noise, it should perform better
than ZF
• Eye Diagrams– Coming up next
• Different Channels– Optional
Eye Diagrams
• Used to visualize how waveforms used to send (modulate) multiple bits of data can lead to detection errors
• The more “open” the eye, the lower the probability of error
• Consider modulated half-sine pulses for four subsequent transmitted bits
Modulated [1 0 0 1]
0 20 40 60 80 100 120 140-1
-0.8
-0.6
-0.4
-0.2
0
0.2
0.4
0.6
0.8
1
[1 0 0 1] After Channel and Noise
0 20 40 60 80 100 120 140-3
-2
-1
0
1
2
3
[1 0 0 1] Eye Diagrams
Before Channel After Channel
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