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Here's my goal:

I'm trying to find a way to search through a data signal and find (index) locations where a known, repeating binary data sequence is located. Then, because the spreading code and demodulation is known, pull out the corresponding chip of data and read it. Currently, I believe xcorr will do the trick.

Here's my problem:

I can't seem to interpret my result from xcorr or xcorr2 to give me what I'm looking for. I'm either having a problem cross-referencing from the vector location of my xcorr function to my time vector, or a problem properly identifying my data sequence with xcorr, or both. Other possibilities may exist.

Where I am at/What I have:

I have created a random BPSK signal that consists of the data sequence of interest and garbage data over a repeating period. I have tried processing it using xcorr, which is where I am stuck.

Here's my code:

%% Clear Variables

clc;
clear all, close all;

%% Create random data

nbits = 2^10;
ngarbage = 3*nbits;
data = randi([0,1],1,nbits);
garbage = randi([0,1],1,ngarbage);
stream = horzcat(data,garbage); 

%% Convert from Unipolar to Bipolar Encoding

stream_b = 2*stream - 1;

%% Define Parameters

%%% Variable Parameters
nsamples = 20*nbits;
nseq = 5 %# Iterate stream nseq times
T = 10; %# Number of periods
Ts = 1; %# Symbol Duration
Es = Ts/2; %# Energy per Symbol
fc = 1e9; %# Carrier frequency

%%% Dependent Parameters
A = sqrt(2*Es/Ts); %# Amplitude of Carrier
omega = 2*pi*fc %# Frequency in radians
t = linspace(0,T,nsamples) %# Discrete time from 0 to T periods with nsamples samples
nspb = nsamples/length(stream) %# Number of samples per bit

%% Creating the BPSK Modulation
%# First we have to stretch the stream to fit the time vector. We can quickly do this using _
%# simple matrix manipulation.

% Replicate each bit nspb/nseq times
repStream_b = repmat(stream_b',1,nspb/nseq);

% Tranpose and replicate nseq times to be able to fill to t
modSig_proto = repmat(repStream_b',1,nseq);

% Tranpose column by column, then rearrange into a row vector
modSig = modSig_proto(:)';

%% The Carrier Wave

carrier = A*cos(omega*t);

%% Modulated Signal

sig = modSig.*carrier;

Using XCORR

I use xcorr2() to eliminate the zero padding effect of xcorr on unequal vectors. See comments below for clarification.

corr = abs(xcorr2(data,sig); %# pull the absolute correlation between data and sig
[val,ind] = sort(corr(:),'descend') %# sort the correlation data and assign values and indices
ind_max = ind(1:nseq); %# pull the nseq highest valued indices and send to ind_max

Now, I think this should pull the five highest correlations between data and sig. These should correspond to the end bit of data in the stream for every iteration of stream, because I would think that is where the data would most strongly cross-correlate with sig, but they do not. Sometimes the maxes are not even one stream length apart. So I'm confused here.

Question

In a three part question:

  1. Am I missing a certain step? How do I use xcorr in this case to find where data and sig are most strongly correlated?

  2. Is my entire method wrong? Should I not be looking for the max correlations?

  3. Or should I be attacking this problem from another angle, id est, not use xcorr and maybe use filter or another function?

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wow...pretty long and verbose question..do you think it would be possible to reduce the question to a couple of lines with focus only on the real problem you're facing? –  fpe Apr 23 '13 at 21:28
    
@fpe I apologize for enabling the -v option ...Well I didn't want to leave anything out. Usually it seems when questions are summarized, a lot of follow on questions are asked. To summarize this question: "How do I use xcorr to find the data stream data in the modulated signal sig?" –  endowdly Apr 23 '13 at 21:30
    
You still didn't show how you are calculating xcorr though ;) Please add that –  Dan Apr 24 '13 at 8:00
    
@Dan I thought I did. I used the code in the second code block: corr = abs(xcorr2(data,sig); then I used a simple sort to pull out the max correlations. Is this what you mean? I just edited my question to better highlight the xcorr block. –  endowdly Apr 24 '13 at 11:23
    
oh are you saying int16(xcorr2) == int16(xcorr(xcorr ~= 0) is actually int16(xcorr2(data,sig)) == int16(xcorr(xcorr(data, sig) ~= 0)?? Because as you have it in your question it looks like you are using xcorr as a variable, not a function. –  Dan Apr 24 '13 at 12:08

3 Answers 3

Your overall method is great and makes a lot of sense. The problem you're having is that you're getting some actual correlation with your garbage data. I noticed that you shifted all of your sream to be zero-centered, but didn't do the same to your data. If you zero-center the data, your correlation peaks will be better defined (at least that worked when I tried it).

data = 2*data -1;

Also, I don't recommend using a simple sort to find your peaks. If you have a wide peak, which is especially possible with a noisy signal, you could have two high points right next to each other. Find a single maximum, and then zero that point and a few neighbors. Then just repeat however many times you like. Alternatively, if you know how long your epoch is, only do a correlation with one epoch's worth of data, and iterate through the signal as it arrives.

share|improve this answer
    
In my efforts to solve this myself, I was definitely moving towards the solution you suggested. I did zero-center the data, and it does help. However, as you noted, there is a lot of noise because of the correlation between data and garbage. So I am starting to work on the epoch iteration idea. So far -- break the sig into an array (let's call it epochArray) with length length(sig)/nseq and nseq rows. Then, iteratively seperate the array into rows, so that epoch1 = epochArray(1,:), epoch2 = epochArray(2,:) et cetera while also correlating data to each epochArray row. About right? –  endowdly Apr 25 '13 at 11:50
    
@endowdly: Sounds about right! To simplify things and make it easier for expansion in the future, I recommend simply looping through the signal and having an 'epoch' variable that updates each loop. This prevents having too many individual epoch variables and a large epochArray. –  David K Apr 25 '13 at 12:24
    
Good idea! I'll work through that and see what shakes out. note: I have been able to visually identify the correlations I'm looking for by adding the epoch boundaries to my xcorr2 plot; you can easily see a spike at ~nbits into each epoch. For 2^4 and less nbits, the correlation is exactly where you expect it to be (e.g. at t = 32). Seems my basic idea works perfect for low nbit numbers. So let's see how can make it work for the higher amounts! –  endowdly Apr 25 '13 at 13:28
    
I've also found that it helps if you stretch the data signal to correspond to the length of one iteration. I don't know why I overlooked this. When I finally figure out how to pull the correlations out, I'll post if it works or not. I'm currently trying to do a max average of a "slice" of the correlations based on your max point zeroing advice. –  endowdly Apr 26 '13 at 17:31

Try flipping the signal, i.e.:

corr = abs(xcorr2(data,sig(end:-1:1));

Is that any better?

share|improve this answer
    
After checking this out... isn't this identical to corr = abs(xcorr2(data,fliplr(sig))); ? I didn't mention this early, but I did try fliplr on both data and sig seperately. Didn't seem to improve sorting or finding maxes. –  endowdly Apr 24 '13 at 13:23
    
This does however, help arrange the data to be better visually identified. See my comments on David K's answer. –  endowdly Apr 25 '13 at 13:29
    
actually the best way to see this, where the vectors slide as you would expect (small along big) do corr = abs(xcorr2(sig,data)); –  endowdly May 2 '13 at 10:24
up vote 0 down vote accepted

With @David K 's and @Patrick Mineault's help I manage to track down where I went wrong. First @Patrick Mineault suggested I flip the signals. The best way to see what you would expect from the result is to slide the small vector along the larger, searched vector. So

corr = xcorr2(sig,data);

Then I like to chop off the end there because it's just extra. I did this with a trim function I made that simply takes the signal you're sliding and trims it's irrelevant pieces off the end of the xcorr result.

trim = @(x,s2) x(1:end - (length(s2) - 1));
trim(corr,data);

Then, as @David K suggests, you need to have the data stream you're looking for encoded the same as your searched signal. So in this case

data = 2*data-1;

Second, if you just have your data at it's original bit length, and not at it's stretched, iterated length, it can be found in the signal but it will be VERY noisy. To reduce the noise, simply stretch the data to match it's stretched length in the iterated signal. So

rdata = repmat(data',1,nspb/nseq);
rdata = repmat(rdata',1,nseq);
data = rdata(:)';

Now finally, we should have crystal clear correlations for this case. And to pull out the maxes that should correspond to those correlations I wrote

[sortedValues sortIndex] = sort(corr(:),'descend');
c = 0 ;
for r = 1 : length(sortedValues)
    if sortedValues(r,:) == max(corr)
        c = c + 1;
        maxIndex(1,c) = sortIndex(r,:);
    else break % If you don't do this, you get loop lock
    end
 end 

Now c should end up being nseq for this case and you should have 5 index times where the corrs should be! You can easily pull out the bits with another loop and c or length(maxIndex). I've also made this into a more "real world" toy script, where there is a data stream, doppler, fading, and it's over a time vector in seconds instead of samples.

Thanks for the help!

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