Sign up ×
Stack Overflow is a community of 4.7 million programmers, just like you, helping each other. Join them; it only takes a minute:

I have two very large matrices (60x25000) and I'd like to compute the correlation between the columns only between the two matrices. For example:

corrVal(1) = corr(mat1(:,1), mat2(:,1);
corrVal(2) = corr(mat1(:,2), mat2(:,2);
corrVal(i) = corr(mat1(:,i), mat2(:,i);

For smaller matrices I can simply use:

   colCorr = diag( corr( mat1, mat2 ) );

but this doesn't work for very large matrices as I run out of memory. I've considered slicing up the matrices to compute the correlations and then combining the results but it seems like a waste to compute correlation between column combinations that I'm not actually interested.

Is there a quick way to directly compute what I'm interested?

Edit: I've used a loop in the past but its just way to slow:

mat1 = rand(60,5000);
mat2 = rand(60,5000);
nCol = size(mat1,2);
corrVal = zeros(nCol,1);

for i = 1:nCol
    corrVal(i) = corr(mat1(:,i), mat2(:,i));

This takes ~1 second

corrVal = diag(corr(mat1,mat2));

This takes ~0.2 seconds

share|improve this question
I made an edit to your post ; please check if it's correct. – Jacob Feb 13 '12 at 15:46
Also, what's wrong with the obvious for loop? – Jacob Feb 13 '12 at 15:47
the edit is correct, thanks! Also the loop is way to slow – slayton Feb 13 '12 at 16:07
I made another change. Also, on my PC, the loop took ~1.7s and the diag version is still running (well over a minute). – Jacob Feb 13 '12 at 16:15
OK, I reduced the matrix to 60x500 and the loop & diag versions took ~0.17s and ~16.7s resp. – Jacob Feb 13 '12 at 16:20

2 Answers 2

up vote 13 down vote accepted

I can obtain a x100 speed improvement by computing it by hand.

An=bsxfun(@minus,A,mean(A,1)); %%% zero-mean
Bn=bsxfun(@minus,B,mean(B,1)); %%% zero-mean
An=bsxfun(@times,An,1./sqrt(sum(An.^2,1))); %% L2-normalization
Bn=bsxfun(@times,Bn,1./sqrt(sum(Bn.^2,1))); %% L2-normalization
C=sum(An.*Bn,1); %% correlation

You can compare using that code:


for i = 1:size(A,2)
    C(i)=corr(A(:,i), B(:,i));

mean(abs(C-C2)) %% difference between methods

Here are the computing times:

Elapsed time is 10.822766 seconds.
Elapsed time is 0.119731 seconds.

The difference between the two results is very small:


ans =

EDIT: explanation

bsxfun does a column-by-column operation (or row-by-row depending on the input).


This line will remove (@minus) the mean of each column (mean(A,1)) to each column of A... So basically it makes the columns of A zero-mean.


This line multiply (@times) each column by the inverse of its norm. So it makes them L-2 normalized.

Once the columns are zero-mean and L2-normalized, to compute the correlation, you just have to make the dot product of each column of An with each column of B. So you multiply them element-wise An.*Bn, and then you sum each column: sum(An.*Bn);.

share|improve this answer
wow that is fast. Can you give me a quick explanation as to why this works? – slayton Feb 13 '12 at 16:57
I've added some explanation. I hope it's not to unclear... – Oli Feb 13 '12 at 17:05
@Oli: Great answer! – Jacob Feb 13 '12 at 17:31

I think the obvious loop might be good enough for your size of problem. On my laptop it takes less than 6 seconds to do the following:

A = rand(60,25000);
B = rand(60,25000);
n = size(A,1);
m = size(A,2);

corrVal = zeros(1,m);
for k=1:m
    corrVal(k) = corr(A(:,k),B(:,k));
share|improve this answer
whoops, I didn't see your edit. Wow, diag is way faster. – Ian Hincks Feb 13 '12 at 16:13
Wait, what am I missing? diag(corr(A,B)); takes over 10 seconds for me. – Ian Hincks Feb 13 '12 at 16:15
Yep. Same here. – Jacob Feb 13 '12 at 16:16
Can you run diag(corr(A,B)) on matrices that big? I get an out of memory error when I try to run in on these matrices – slayton Feb 13 '12 at 16:20
@slayton: I don't think you can. Besides, it seems that the loop version is faster! – Jacob Feb 13 '12 at 16:21

Your Answer


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.