Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have a matrix in SAS IML. For each pair of rows (say vectors A and B), I want to calculate the cosine similarity,

A . B / ( ||A|| x ||B|| ).

So the result should be a square matrix with the same number of rows as as the initial matrix.

If I pass a vector to the Euclid function, I get back a vector, so the function appears to be acting separately on each element of the vector. Indeed, the SAS documentation says:

If you call a Base SAS function with a matrix argument, the function will usually act elementwise on each element of teh [sic] matrix.

This is weird -- why would anyone want to calculate summary statistics for each element of a vector? They will always just return the elements. Is there a way to get the Euclidean norm for a vector?

My code is below. Notwithstanding the Euclidean norm, is there a more efficient way to do this?

proc iml;
 use fundstr;
 read all var _all_ into wgts;

 nrows=nrow(wgts);
 d=j(nrows,nrows,0);

 do i = 1 to nrows;
  do j = i to nrows;

  tmp = wgts[i,]*wgts[j,]`; /** need to divide by norms each vector **/
  d[i,j] = tmp;
  d[j,i] = tmp;

   end;
 end;
quit;
share|improve this question

2 Answers 2

up vote 2 down vote accepted

Use matrix operations and think of this problem as (A/||A||) * (B/||B||).

The first step is to divide each row by its Euclidean norm, which is just sqrt(ssq(wgts[i,])). You can use the "sum of squares" subscript reduction operator (##) to compute this for all rows at once without writing a loop: sqrt(wgts[ ,##]); (See http://blogs.sas.com/content/iml/2012/05/23/compute-statistics-for-each-row-by-using-subscript-operators/ for an explanation and examples of subscript reduction operators.)

The pairwise dot product of rows is equivalent to the matrix multiplication A*A`, where A is the scaled matrix. Putting this all together leads to the solution:

wgts = ranuni(j(5,5));         
norm = sqrt(wgts[ ,##]); /* Euclidean norm */
A = wgts/norm; 
d = A*A`;
print d;

If you want to compare this to the (inefficient) solution that uses loops, here it is:

nrows=nrow(wgts);
d=j(nrows,nrows,0);
do i = 1 to nrows;
   normi = sqrt(wgts[i,##]);
   do j = i to nrows;
      normj = sqrt(wgts[j,##]);
      tmp = wgts[i,]*wgts[j,]` / (normi * normj);
      d[i,j] = tmp;
      d[j,i] = tmp;
   end;
 end;
 print d;

By the way, you'll be happy to hear that in the next release of SAS/IML the typo in the doc is fixed :-)

share|improve this answer

To provide a reference, I think this article by Rick is probably a good read for you. The method converting vectors to comma-delimited string is quite convenient.

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.