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Suppose there have N vectors X_1, X_2, ..., X_N of length k each. We want all possible sums X_1(i1) + X_2(i2) + ... + X_N(iN), where i1, i2, ..., iN range from 1...k. There are k^N such sums. Is there any other way of doing it in Matlab using the built in functions, other than having N for-loops like below:

counter = 1;
for i1=1:k
  for i2=1:k
  .
   .
    .
      for iN=1:k
          res(counter) = X_1(i1) + X_2(i2) + ... + X_N(iN); 
          counter = counter + 1;
      end
    .
   .
  .
  end
end

Also, this code needs to be hard-coded for the value of N, as we need N for-loops. How do we code it for any general value of N ?

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2 Answers

A single loop of N iterations should be enough. (here it's unrolled)

sums=zeros(1,k^N);
id = 1:k^N;
i = mod(id, k)+1; id=(id-i) / k;
sums = sums + X_1(i);
i = mod(id, k)+1; id=(id-i) / k;
sums = sums + X_2(i);
...
i = mod(id, k)+1; id=(id-i) / k;
sums = sums + X_N(i);
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The answer is to use ndgrid.

[s{1:N}] = ndgrid(-K:K);
res = zeros(k^N,1);
for i=1:N
   res = res + s{i}(:)
end
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