# Vectorizing subscript to matrix conversion

Given two vectors r and c that hold row and column subscripts into a matrix A (its size also given), I want to compute A. Points can occur multiple times and should increment the corresponding element in A for every occurence. An example:

``````r = [1 2 4 3 2];
c = [2 2 1 1 2];
A = zeros(4, 3);

ind = sub2ind(size(A), r, c);
for i = 1 : length(ind)
A(ind(i)) = A(ind(i)) + 1; % could as well use r and c instead of ind ...
end
``````

This yields the matrix

``````A =
0     1     0
0     2     0
1     0     0
1     0     0
``````

I'd like to avoid the loop if possible. Is there a vectorized solution to this problem? Preferably one that does not generate huge temporary matrices ...

-

This is a job for `accumarray`:

``````r = [1 2 4 3 2];
c = [2 2 1 1 2];

%# for every r,c pair, sum up the occurences
%# the [4 3] is the array size you want
%# the zero is the value you want where there is no data
accumarray([r',c'],ones(length(r),1),[4 3],@sum,0)

ans =

0     1     0
0     2     0
1     0     0
1     0     0
``````

Note that if your resulting array has so many zeros (i.e. is very sparse), `sparse` may be the better option, as suggested by @woodchips

``````sparse(r,c,ones(size(r)),4,3)

ans =

(3,1)        1
(4,1)        1
(1,2)        1
(2,2)        2
``````
-
+1 because this is an effective answer, but the question still highlights Matlab's extreme weakness when it comes to evaluating arrays at desired indices. The only reason that a simple call to `A(ind) += 1;` doesn't work is because the array of indices requests two accesses to the entry at (2,2), and Matlab cannot do this in a single call. Imagine if instead of merely incrementing these indices, the OP wanted to do a complicated operation at these places. Your answer works, but I think it doesn't get at the spirit of the question. –  EMS Apr 18 '12 at 19:16
@EMS: What kind of more complex operation would you have wanted to perform? –  Jonas Apr 18 '12 at 19:52
Suppose `A` was a 3D array instead of 2D, and the depth dimension was RGB values. It would make sense to index a lot of things based on just the two-dimensional array of pixels. Then let's say I run a classifier cascade over the image and record the (i,j) locations where the classifier cascade "fires" to signal a detection. This can happen multiple times at the same pixel, so it could plausibly give the sort of repeated index lists in the OP's question. –  EMS Apr 18 '12 at 20:03
Often, I want to apply feature extraction around these selected indices. So I may want to compute a local gradient, threshold it, and then put it into angle/magnitude bins, and return a histogram vector in the tiny region around the indexed pixel. The precise histogram may be different if different classifiers in the cascade had "fired" for a given pixel. In Python, for example, I can easily do this with `map()` and list comprehensions. In Matlab, it's a real pain. –  EMS Apr 18 '12 at 20:04
Sparse may be a better choice than accumarray here, as the result will be a sparse matrix. –  user85109 Apr 18 '12 at 21:48