convert consecutive ones into alternating one/zero's

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William Reinders
William Reinders on 27 Nov 2012
I need to convert a vector consisting of ones and zero's such that consecutive blocks of 1's will be replaced by alternating ones and zeros. Example:
[0 1 0 1 0 0 1 1 0 1 1 1 1 0 1] needs to be converted to:
[0 1 0 1 0 0 1 0 0 1 0 1 0 0 1]
Of course that can be done in a loop, but I'm looking for a vectorized way of accomplishing this. Any ideas?
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Arthur
Arthur on 27 Nov 2012
It is maybe more elegant to vectorize it, but do you really need it? The loop you suggest yourself is very easy to understand, and fast. For 1e6 flags it took my pc less then 40 ms. So I'd just go for the loop....
Jan
Jan on 27 Nov 2012
+1: Thanks for this interesting problem. Sometime I love the bit nudging.

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Accepted Answer

Matt Fig
Matt Fig on 27 Nov 2012
I would be surprised to find you could beat this loop:
ii = 2;
while ii<=length(A)
if A(ii-1) && A(ii)
A(ii) = 0;
ii = ii + 2;
else
ii = ii + 1;
end
end
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Matt Fig
Matt Fig on 27 Nov 2012
I compared exactly with your cleaned up FOR loop. (The one I commented on, not the MEX you later posted.)
Jan
Jan on 28 Nov 2012
@Matt Fig: In the discussion about the performance of "Matlab compared to C" I claimed: "...performance is not an inherent feature of the language, but the programmer has to exploit the inner structure of problem...". Your WHILE approach is an excellent example: The behaviour of the system is used to avoid unneeded computations. A straight-forward loop approach cannot be "fast" in general. It is the job of the programmer to exploit the possibilities to avoid unnecessary work.

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More Answers (4)

Sean de Wolski
Sean de Wolski on 27 Nov 2012
One of many ways:
double(regexprep(char([0 1 0 1 0 0 1 1 0 1 1 1 1 0 1]),char([1 1]),char([1 0])))
hint This is certainly not the best way!
Jan
Jan on 27 Nov 2012
Edited: Jan on 27 Nov 2012
Compare the timings with this cleaned loop method:
for k = 2:length(flags)
if flags(k-1) && flags(k)
flags(k) = 0;
end
end
Note, that the JIT accelerator can profit from using one command per line only.
[EDITED] I assume the program is noticably faster when flag is a logical array.
Image Analyst
Image Analyst on 27 Nov 2012
Do you have the Image Processing Toolbox, because this is fairly easy if you have it, though you'd still need at least one for loop over each connected component but not two for loops like your brute force method would:
m = [0 1 0 1 0 0 1 1 0 1 1 1 1 0 1]
blobs = regionprops(logical(m), 'PixelIdxList');
for blobNumber = 1 : length(blobs)
thisBlobsIndexes = blobs(blobNumber).PixelIdxList
m(thisBlobsIndexes(2:2:end)) = 0;
end
% Print out
m
Jan
Jan on 27 Nov 2012
Edited: Jan on 28 Nov 2012
#include "mex.h"
void mexFunction(int nlhs, mxArray *plhs[], int nrhs, const mxArray *prhs[]) {
mxLogical *In, *Out;
mwSize i, n;
if (!mxIsLogical(prhs[0])) {
mexErrMsgTxt("Input must be a logical vector.");
}
In = (mxLogical *) mxGetData(prhs[0]);
n = mxGetNumberOfElements(prhs[0]);
plhs[0] = mxCreateLogicalMatrix(1, n);
Out = (mxLogical *) mxGetData(plhs[0]);
/* The FOR loop approach: */
/* Out[0] = In[0];
* for (i = 1; i < n; i++) {
* if (In[i]) {
* if (!Out[i - 1]) {
* Out[i] = true;
* }
* }
*}
*/
/* Matt Fig's faster WHILE: */
i = 2;
while (i < n) {
if (In[i] && !In[i - 1]) {
Out[i] = true;
i += 2;
} else {
i++;
}
}
return;
}
Timings:
  • Test data: A = rand(1, 1e8) > 0.05;
  • Matlab 2009a/64, Win7, Core2Duo
  • MEXed FOR loop: 0.49 sec
  • MEXed WHILE loop: 0.28 sec
  • Matlab WHILE: 1.26 sec
  • Matlab FOR: 1.90 sec
  • Original Matlab FOR: 2.33 sec (if A(i)==1 && A(i+1)==1)
  2 Comments
William Reinders
William Reinders on 28 Nov 2012
Thanks for your elaborate answer. Just for my understanding: What causes the original Matlab FOR to be so much slower than the Matlab WHILE ?
Jan
Jan on 28 Nov 2012
  1. The comparison with 1 in A(i)==1 && A(i+1)==1 consumes time. Using A(i) && A(i+1) is faster already.
  2. When the while loop sets a value to 0, it avoids testing the following element, because it is not needed. If all elements of the inputs are non-zero, Matt Fig's method omits half of the tests.
  3. In the Matlab version, the speedup of the loop is below the theoretical limit. I assume, the JIT acceleration handles the FOR loop more efficiently due to the fixed stepsize. In the MEXed version, the WHILE approach is 40% faster, which is near to the naiv expectations.

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