# Getting all submatrices

I have got an N×M matrix `m` like:

`````` 1  2  3  4
5  6  7  8
9 10 11 12
13 14 15 16
``````

I want to get all submatrices of size P×Q (P,Q are odd) w/o employing a for-loop.

The result `s` should be a P×Q×((N-P+1)·(M-Q+1)) matrix.

E.g. if P=Q=3:

``````s(:,:,1) = [1 2 3;  5  6  7;  9 10 11]
s(:,:,2) = [2 3 4;  6  7  8; 10 11 12]
s(:,:,3) = [5 6 7;  9 10 11; 13 14 15]
s(:,:,4) = [6 7 8; 10 11 12; 14 15 16]
``````
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Why are there multiples? Eg. `5 6 7` appears twice. – Jonas Dec 4 '12 at 21:27
@Jonas sorry, my example was confusing. Is it easier to understand now? – Kay Dec 4 '12 at 21:55
No, I still don't quite understand: Why would you want to have duplicate entries? Just so that you can fill up your array? Also, have you had a look at my solution? – Jonas Dec 5 '12 at 0:15

`im2col` can help you out here:

``````m =
1     2     3     4
5     6     7     8
9    10    11    12
13    14    15    16

>> P = 3; Q = 3;
>> columnized = im2col(m,[P Q],'sliding');
>> nMatrices = size(columnized,2);
>> s = reshape(columnized, [P Q nMatrices])

s(:,:,1) =
1     2     3
5     6     7
9    10    11
s(:,:,2) =
5     6     7
9    10    11
13    14    15
s(:,:,3) =
2     3     4
6     7     8
10    11    12
s(:,:,4) =
6     7     8
10    11    12
14    15    16
``````

`im2col` with the `'sliding'` option finds all the overlapping submatrices and returns each as a (P·Q)-element column vector in `columnized`. To turn these back into matrices, we `reshape` this (P·Q)×((N-P+1)·(M-Q+1)) matrix into a P×Q×((N-P+1)·(M-Q+1)) one.

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