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I have a very long vector 1xr v, and a very long vector w 1xs, and a matrix A rxs, which is sparse (but very big in dimensions).

I was expecting the following to be optimized by Matlab so I won't run into trouble with memory:

 A./(v'*w)

but it seems like Matlab is actually trying to generate the full v'*w matrix, because I am running into out of memory issue. Is there a way to overcome this? Note that there is no need to calculate all v'*w because many values of A are 0.

EDIT: If that were possible, one way to do it would be to do A(find(A))./(v'*w)(find(A));

but you can't select a subset of a matrix (v'*w in this case) without first calculating it and putting it in a variable.

  • 1
    You probably want to instead use spfun -- "Apply function to nonzero sparse matrix elements" – Ben Voigt Nov 1 '13 at 21:07
  • mmm... spfun might be a good lead, but I am not sure how to use it in this case. first, the evaluated function is unaware of the index of the matrix cell it is applied on. – kloop Nov 1 '13 at 21:15
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  • You could use bsxfun. This gives the same result as A./(v'*w) without generating the matrix v.'*w:

    bsxfun(@rdivide, bsxfun(@rdivide, A, v'), w)
    
  • Another possibility: if you only want the nonzero values, use:

    [ii jj Anz] = find(A);
    Anz./v(ii)'./w(jj).'
    

    This gives a column vector corresponding to your A(find(A))./(v'*w)(find(A)), again without generating v.'*w. If you need the sparse matrix A./(v'*w) (instead if the column vector of its nonzero values), use sparse(ii,jj,Anz./v(ii)'./w(jj).').

  • Another rdivide answer! Very nice. But the nonzero solution might be needed because of the memory problems, but then again you have rearranged the terms to address that I see. – chappjc Nov 1 '13 at 22:05
  • @chappjc Yes, since I learned about bsxfun I tend to apply it to everything :-) I don't get your point about rearranging the terms – Luis Mendo Nov 1 '13 at 22:08
  • kloop has (v'*w) grouped, but you can handle them sequentially. It's just the nature of the problem I didn't grasp at first glance. As a result, the answer is actually different from the reference by 5.8208e-11 in a test case I just tried... machine precision error accumulating, but still tiny. – chappjc Nov 1 '13 at 22:12

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