Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I need to calculate the euclidean distance between 2 matrices in matlab. Currently I am using bsxfun and calculating the distance as below( i am attaching a snippet of the code ):

for i=1:4754
test_data=fea_test(i,:);
d=sqrt(sum(bsxfun(@minus, test_data, fea_train).^2, 2));
end

Size of fea_test is 4754x1024 and fea_train is 6800x1024 , using his for loop is causing the execution of the for to take approximately 12 minutes which I think is too high. Is there a way to calculate the euclidean distance between both the matrices faster?

I was told that by removing unnecessary for loops I can reduce the execution time. I also know that pdist2 can help reduce the time for calculation but since I am using version 7. of matlab I do not have the pdist2 function. Upgrade is not an option.

Any help.

Regards,

Bhavya

share|improve this question

3 Answers 3

up vote 2 down vote accepted

You could fully vectorize the calculation by repeating the rows of fea_test 6800 times, and of fea_train 4754 times, like this:

rA = size(fea_test,1);
rB = size(fea_train,1);

[I,J]=ndgrid(1:rA,1:rB);

d = zeros(rA,rB);

d(:) = sqrt(sum(fea_test(J(:),:)-fea_train(I(:),:)).^2,2));

However, this would lead to intermediary arrays of size 6800x4754x1024 (*8 bytes for doubles), which will take up ~250GB of RAM. Thus, the full vectorization won't work.

You can, however, reduce the time of the distance calculation by preallocation, and by not calculating the square root before it's necessary:

rA = size(fea_test,1);
rB = size(fea_train,1);
d = zeros(rA,rB);

for i = 1:rA
    test_data=fea_test(i,:);
    d(i,:)=sum( (test_data(ones(nB,1),:) -  fea_train).^2, 2))';
end

d = sqrt(d);
share|improve this answer
2  
repmat is never good for performance. You're better off inlining in this case: replace repmat(test_data,nB,1) with test_data(ones(1,n8), :). –  Nzbuu Oct 8 '11 at 13:31
    
@Nzbuu: yes, right. I've edited my answer. –  Jonas Oct 8 '11 at 14:35
    
@Jones thank you for this reply, but this does not reduce the number of for loops i have in my code. I already have a for loop within which this loop is found and the execution time is still the same. –  bhavs Oct 8 '11 at 15:01
2  
@BhavyaPH: The solution that reduces the number of for loops will most likely not run on your computer due to not enough RAM. The other solution should reduce the execution time. Have you used the profiler to compare? –  Jonas Oct 8 '11 at 15:49
1  
Removing for loops isn't always fastest due to the JIT. See stackoverflow.com/questions/7569368/…, and many other questions on SO. –  Nzbuu Oct 8 '11 at 17:32

Here is vectorized implementation for computing the euclidean distance that is much faster than what you have (even significantly faster than PDIST2 on my machine):

D = sqrt( bsxfun(@plus,sum(A.^2,2),sum(B.^2,2)') - 2*(A*B') );

It is based on the fact that: ||u-v||^2 = ||u||^2 + ||v||^2 - 2*u.v


Consider below a crude comparison between the two methods:

A = rand(4754,1024);
B = rand(6800,1024);

tic
D = pdist2(A,B,'euclidean');
toc

tic
DD = sqrt( bsxfun(@plus,sum(A.^2,2),sum(B.^2,2)') - 2*(A*B') );
toc

On my WinXP laptop running R2011b, we can see a 10x times improvement in time:

Elapsed time is 70.939146 seconds.        %# PDIST2
Elapsed time is 7.879438 seconds.         %# vectorized solution

You should be aware that it does not give exactly the same results as PDIST2 down to the smallest precision.. By comparing the results, you will see small differences (usually close to eps the floating-point relative accuracy):

>> max( abs(D(:)-DD(:)) )
ans =
  1.0658e-013

On a side note, I've collected around 10 different implementations (some are just small variations of each other) for this distance computation, and have been comparing them. You would be surprised how fast simple loops can be (thanks to the JIT), compared to other vectorized solutions...

share|improve this answer
    
+1 this is a good answer –  Alex Jun 29 '12 at 16:19
1  
@Alex: thanks. I see your solution is basically the same, only I avoid creating temp matrices in memory by using BSXFUN (instead of using REPMAT and the like) –  Amro Jun 29 '12 at 17:27
    
Agree, bsxfun is one of the underrated and unknown functions in MATLAB. It doesn't waste memory like repmat. More users need to learn how to use it when 'vectorizing' their code. –  Alex Jun 29 '12 at 19:31
    
Just a quick note, I compared both PDIST2 and your method using bsxfun and serially bsxfun is much faster. However, inside of a parfor loop performance actually got worse using your bsxfun method for DD. –  brown.2179 Mar 2 at 17:14

Try this vectorized version, it should be pretty efficient. Edit: just noticed that my answer is similar to @Amro's.

function K = calculateEuclideanDist(P,Q)
% Vectorized method to compute pairwise Euclidean distance
% Returns K(i,j) = sqrt((P(i,:) - Q(j,:))'*(P(i,:) - Q(j,:)))

[nP, d] = size(P);
[nQ, d] = size(Q);

pmag = sum(P .* P, 2);
qmag = sum(Q .* Q, 2);

K = sqrt(ones(nP,1)*qmag' + pmag*ones(1,nQ) - 2*P*Q');

end
share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.