Summing elements of one Matrix according to the the values in another matrix into an array

I want to sum the elements of the matrix M according to the the values in the matrix R into the array d.

Theoretically, it's cannot be serialized, because the action of summing into one array (D) requires memory access to the same data.

I implemented it in the following way

``````for ind = 1: numel(R)
d(R(ind)) = d(R(ind)) + M(ind);
end
``````

like @Andrew suggested in this related topic: How do I iterate through each element in an n-dimensional matrix in MATLAB?

The elements of the array R and not every large, but also not 1 or 2, it can be for example 1 to 15.

Is there a more efficient way to do it in Matlab, even if the "theoretical complexity" of the action would be worse ?

For it could be solved also by iterating over the possible values in R and summing the elements of M in indexes where R = val , or anything more "built-in" in Matlab, which don't "like" loops generally speaking.

In SQL for example you have a "built-in" method to collapse repetition of one column and get the sum of the values in the other column.

There is a topic about similar action but in different langauge : Collapse a matrix to sum values in one column by values in another

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Please give some minimal example of R and M and the expected output. –  Bas Swinckels Sep 16 '13 at 12:41

2 Answers

It is probable that this can be done using Matlab's `accumarray` function. Something like this:

``````d = accumarray(R, M, expected_size_of_d)
``````

But it would be useful if you give us example values for `M` and `R` and the expected `d`, since the exact solution might depend on the shape of your matrices, the fact if you use linear indexing or not ...

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Your question is not very clear. If you want to sum selected elements of `M`, where the selection is given by `R`, you can do as follows:

``````dsum(M(sub2ind(size(M),R(:,1),R(:,2))))
``````

For example, consider

``````M = [1 2 3;
4 5 6;
7 8 9];

R = [1 1; 3 1; 2 2]; % each row selects an element of M
``````

The result gives M(1,1) + M(3,1) + M(2,2):

``````>> sum(M(sub2ind(size(M),R(:,1),R(:,2))))
ans =
13
``````
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