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I am a newbie with Matlab and I have the following scenario( which is part of a larger problem).

matrix A with 4754x1024 and matrix B with 6800x1024 rows.

For every row in matrix A i need to calculate the euclidean distance in matrix B. I am using the following technique to calculate the distance but I find that this is very inefficient and very time consuming in Matlab.

for i=1:row_A
  for j=1:row_B
     %calculate distance

Any suggestions to optimise this because the final step involves performing this operation on 50 such sets of A and B.

Thanks and Regards,


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Your current code does not use A_data or B_data, and test_data and train_data and train_class have no definition. – Hannes Ovrén Sep 27 '11 at 13:25
No idea whatsoever on matlab stuff, but the most common optimization in calculating euclidean distance is not to do it. Instead, computer the squared distance, and compare squared distances (square any raw values you want to compare against, too). This saves one reciprocal square root per distance. – Damon Sep 27 '11 at 13:37
@kigurai thank you for pointing this out to me, I have made the necessary corrections. At my end I have the matrix definitions. A_test and B_train are 2 very large matrices with the dimensions as mentioned in the problem statement. – bhavs Sep 27 '11 at 15:42
@Damon it is a requirement for me to use euclidean, though I can use the method you have mentioned, I would like to know if there is a way for me to aviod loops – bhavs Sep 27 '11 at 15:43

1 Answer 1

up vote 1 down vote accepted

I'm not sure what your code is actually doing.

Assuming your data has the following properties

assert(size(A,2) == size(B,2))


d = zeros(size(A,1), size(B,1));
for i = 1:size(A,1)
    d(i,:) = sqrt(sum(bsxfun(@minus, B, A(i,:)).^2, 2));

Or possibly better organised by columns (See "Store and Access Data in Columns" in

At = A.'; Bt = B.';
d = zeros(size(At,2), size(Bt,2));
for i = 1:size(At,2)
    d(i,:) = sqrt(sum(bsxfun(@minus, Bt, At(:,i)).^2, 1));
share|improve this answer
I have not tried to execute this but I am wondering if I can use this principle when rows of both the matrices are dissimilar – bhavs Sep 27 '11 at 15:46
You need to use the version where the size of the arrays along the relevant dimension matches (in this case I've assumed the number of columns match), but data access in MATLAB is fastest when the data is arranged into columns (i.e. when the number of rows match) – Nzbuu Sep 27 '11 at 16:07

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