# Calculating pair correlation for image

I have a binary image, lets say 512x512px. I want to calculate pair correlation g(x). So far I'm doing it in as primitive as inefective way, line by line:

``````function Cr = pairCorr(image)

domains(domains>0) = 1;  % make sure its binary by setting 1 to values > 0
size = length(domains(:, 1)); % image size

for i=1:size
line = domains(:, i); % take one line...
for j=1:size % and for each distance...
s = line(1:end-size+j);
Cr(i, j) = mean(s); %...calculate Cr as mean
end
end

Cr = mean(Cr); % average all lines
``````

Any idea how to do it a bit faster? Thanks!

-
Did you try this: nabil.mabrouk.perso.neuf.fr/spip.php?article14 ? –  Dan Feb 22 '13 at 9:36

Your code (from the loops on) seems to be to be the same as

``````Cr = mean(bsxfun(@rdivide, cumsum(domains), (1:n)'));
``````

where my `n` is your `size`. Don't use size as a variable name in matlab as it's a very useful function. For example you went `length(domains(:,1))` but you could have gone `size(domains, 2)`

What is my code doing:

`cumsum(domains)` finds a cumulative sum down each column. So that's like doing your `for j=1:size s = line(1:end-size+j); Cr(i, j) = mean(s); end` in one shot for the whole matrix. But with `sum` instead of `mean`. So to convert a vector of cumulative sums to means we must divide each element by the column number. So we want to divide by the vector 1:n. `bsxfun` allows us to perform an operation on each slice of a dimension of a matrix. So in the 2D case on each column it allows to divide (that's the `@rdivide`) by another constant column, i.e. `(1:n)'`.

Here is a test showing equivalence:

``````n = 512;
A = rand(n);
A(A > 0.5) = 1;
A(A <= 0.5) = 0

tic
Cr1 = mean(bsxfun(@rdivide, cumsum(A)', (1:n)));
toc

tic
for i=1:n
line = A(:, i);
for j=1:n
s = line(1:end-n+j);
Cr2(i, j) = mean(s);
end
end
Cr2 = mean(Cr2)
toc

mean(mean(Cr1 == Cr2))
``````

Results:

``````Elapsed time is 0.016396 seconds.
Elapsed time is 75.2006 seconds.
``````

So although this is only for 1 run it gives you a speed up of like 4500 which is pretty good I think

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Sorry, updated an error in the code. Now it is correct. Also added a time test –  Dan Feb 22 '13 at 11:14