# trim auto-correlation result in MATLAB

I am using xcorr2(A,A) for computing the auto-correlation. But, the output is bigger than A. How I should trim the output to find the correct auto-correlation matrix? For example, my A matrix is 51x51 and the output will be 101x101. It is clear that the central point has the maximum correlation with itself which in this case is located in (26,26), but in the new auto-correlation map, it is located in (51,51). I need a general way to trim the final output.

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In general you have to take M points from M/2 to 3M/2 in the 1st dimension, and N points from N/2 to 3N/2 in the 2nd dimension, assuming A is an M-by-N matrix:

``````[M, N] = size(A);
cor = xcorr2(A);  %# Shorter form of xcorr(A, A)
C = cor(ceil(M / 2):floor(3 * M / 2), ceil(N / 2):floor(3 * N / 2))
``````

Here `C` would be the trimmed output.

EDIT:
For any two matrices `A` and `B`, the result of `xcorr2(A, B)` would be a (MA+MB-1)×(NA+NB-1) matrix. Here, however, you'll have to decide for yourself which part you want to extract, if the matrices are not of equal dimensions. If you want to extract the significant central part, you can do it like so:

``````[MA, NA] = size(A);
[MB, NB] = size(B);
v = [MA + MB, NA + NB] / 4; %# Just a temporary vector
cor = xcorr2(A, B);
C = cor(ceil(v(1)):floor(3 * v(1)), ceil(v(2)):floor(3 * v(2))
``````
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@ Eitan: thank you. It works :) –  Nicole Sep 11 '12 at 17:03
@ Eitan: what about cross-correlation of A and B? I mean, in a case that A and B have different sizes? –  Nicole Sep 11 '12 at 19:19
Please see my updated answer. –  Eitan T Sep 11 '12 at 19:36
@ Eitan: GREAT MAN –  Nicole Sep 12 '12 at 0:55