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 am trying to implement the following equation using scipy's sparse package:

W = x[:,1] * y[:,1].T + x[:,2] * y[:,2].T + ...

where x & y are a nxm csc_matrix. Basically I'm trying to multiply each col of x by each col of y and sum the resulting nxn matrices together. I then want to make all non-zero elements 1.

This is my current implementation:

    c = sparse.csc_matrix((n, n))
    for i in xrange(0,m):
        tmp = bam.id2sym_thal[:,i] * bam.id2sym_cort[:,i].T
        minimum(tmp.data,ones_like(tmp.data),tmp.data)
        maximum(tmp.data,ones_like(tmp.data),tmp.data)

        c = c + tmp

This implementation has the following problems:

  1. Memory usage seems to explode. As I understand it, memory should only increase as c becomes less sparse, but I am seeing that the loop starts eating up >20GB of memory with a n=10,000, m=100,000 (each row of x & y only has around 60 non-zero elements).

  2. I'm using a python loop which is not very efficient.

My question: Is there a better way to do this? Controlling memory usage is my first concern, but it would be great to make it faster!

Thank you!

share|improve this question
    
x[:,i] is going to give you the ith column of x, not the row –  JoshAdel Aug 4 '11 at 20:25
    
@JoshAdel: You are right, I misspoke, I meant to say multiply the columns of x by columns of y. I have updated the question. Thanks! –  RussellM Aug 5 '11 at 0:45
    
Your equation is a sum of inner products, not outer products. You must transpose the columns of y, not x. (Either that, or the title is wrong.) –  Steve Tjoa Aug 5 '11 at 9:01
    
Please edit your question to be unambiguous respect to transpose. Are you aiming to count how many times each nonzero element is summed in outer product? Thanks –  eat Aug 5 '11 at 11:23
    
@Steve: You are right Steve- I have made the correction. Thanks –  RussellM Aug 5 '11 at 20:08
add comment

2 Answers 2

up vote 2 down vote accepted

Note that a sum of outer products in the manner you describe is simply the same as multiplying two matrices together. In other words,

sum_i X[:,i]*Y[:,i].T == X*Y.T

So just multiply the matrices together.

Z = X*Y.T

For n=10000 and m=100000 and where each column has one nonzero element in both X and Y, it computes almost instantly on my laptop.

share|improve this answer
1  
And the last step would be to set nonzero elements to 1, like Z.data[:]= 1. Al tough it's not really clear, if this is what OP were looking for. Thanks –  eat Aug 5 '11 at 11:19
    
This is the solution I went with. Is this true for all matrices or is it dependent on how sparse my vectors are? I employed eat's advice and set all nonzero elements to one after as well. Thanks! –  RussellM Aug 5 '11 at 20:09
    
Let X = [x1 x2 ... xk] where xi is the i^th column in the n-by-k matrix X. Let Y = [y1 y2 ... yk] where yi is the i^th column in the m-by-k matrix Y. Then for any X and Y, Z = X*Y.T = sum_i xi*yi.T, where Z is n-by-m. –  Steve Tjoa Aug 5 '11 at 22:22
add comment

In terms of memory and performance, this might be a prime candidate for using Cython.

There is a section of the following paper describing its use with sparse scipy matricies:

http://folk.uio.no/dagss/cython_cise.pdf

share|improve this answer
add comment

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.