# Reverse sort and argsort in python

I'm trying to write a function in Python (still a noob!) which returns indices and scores of documents ordered by the inner products of their tfidf scores. The procedure is:

• Compute vector of inner products between doc `idx` and all other documents
• Sort in descending order
• Return the "scores" and indices from the second one to the end (i.e. not itself)

The code I have at the moment is:

``````import h5py
import numpy as np

def get_related(tfidf, idx) :
''' return the top documents '''

# calculate inner product
v = np.inner(tfidf, tfidf[idx].transpose())

# sort
vs = np.sort(v.toarray(), axis=0)[::-1]
scores = vs[1:,]

# sort indices
vi = np.argsort(v.toarray(), axis=0)[::-1]
idxs = vi[1:,]

return (scores, idxs)
``````

where `tfidf` is a `sparse matrix of type '<type 'numpy.float64'>'`.

This seems inefficient, as the sort is performed twice (`sort()` then `argsort()`), and the results have to then be reversed.

• Can this be done more efficiently?
• Can this be done without converting the sparse matrix using `toarray()`?

I don't think there's any real need to skip the `toarray`. The `v` array will be only `n_docs` long, which is dwarfed by the size of the `n_docs` × `n_terms` tf-idf matrix in practical situations. Also, it will be quite dense since any term shared by two documents will give them a non-zero similarity. Sparse matrix representations only pay off when the matrix you're storing is very sparse (I've seen >80% figures for Matlab and assume that Scipy will be similar, though I don't have an exact figure).

The double sort can be skipped by doing

``````v = v.toarray()
vi = np.argsort(v, axis=0)[::-1]
vs = v[vi]
``````

Btw., your use of `np.inner` on sparse matrices is not going to work with the latest versions of NumPy; the safe way of taking an inner product of two sparse matrices is

``````v = (tfidf * tfidf[idx, :]).transpose()
``````
• Thanks for the swift response. Just wondering, do you know how the `toarray()` function works - I take it that it doesn't make a copy of the data
– tdc
Dec 9, 2011 at 12:39
• @tdc: it does make a copy. And it fills in the zero positions. Dec 9, 2011 at 13:14
• @tdc: I just realised that there's one more important optimization to make: you should be using CSR sparse matrices. In any other representation, the inner product computation will be suboptimal. Dec 9, 2011 at 14:16
• 1) can I do things like sorting without making a copy? 2) how expensive is the translation from csc to csr?
– tdc
Dec 9, 2011 at 14:26
• 1) Not that I know. 2) Very cheap. I believe it's just a matter of rearranging some indices, without the data being actually copied. Dec 9, 2011 at 14:31