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.

Suppose I have an matrix nxm accommodating row vectors. I want to have an distance matrix nxn that presents the distance of each vector to each other. How can I do it in Python as I am using Numpy. I know Scipy does it but I want to dirst my hands. I already write a cosine similarity function cos_dist(a,b) where a and b two different vectors. Now I need a caller function that is doing it for each couple of items efficiently. How would I do it?

share|improve this question
If scipy does it, why not look at the source code of the relevant function? It might only depend on numpy already. –  fgb May 9 '13 at 20:26
is not installed and I am not SUDO –  Erogol May 9 '13 at 20:37
Do you know the name of the relevant function? You could just google for the source code. –  fgb May 9 '13 at 20:47
not exactly ... –  Erogol May 9 '13 at 20:57
You might want to look into python virtualenv, which allows you to install python and its dependencies anywhere, without the need to have sudo privileges. –  fgb May 9 '13 at 21:35

2 Answers 2

Why don't you check on scipy's spatial.distance.pdist(), which computes pairwise distances between observations in n-dimensional space and has a vast number of distance functions to choose from?

Since you don't have scipy installed and want to code this using numpy, I suggest you study its source code, which is linked at the top-left of its documentation page.

share|improve this answer
thanks for the effort but not enough since there are lots of wrappers –  Erogol May 9 '13 at 21:21
np. I was hoping that it would at least get you started in the right direction. –  fgb May 9 '13 at 21:26

The following code shows two option to do what you are after. One looping over the array twice and using a Python function to calculate the cos_dist. The second uses a vectorized approach and broadcasting to get the same result x1000 faster.

from __future__ import division
import numpy as np

def cos_dist(a, b):
    mod_a = np.sqrt(a.dot(a))
    mod_b = np.sqrt(b.dot(b))
    return a.dot(b) / mod_a / mod_b

a = np.random.rand(100, 4)

# Slow option
def slow_dist(a):
    items = a.shape[0]
    out_slow = np.ones((items,items))
    for j in xrange(items):
        for k in xrange(j+1, items):
            out_slow[j, k] = cos_dist(a[j], a[k])
            out_slow[k, j] = out_slow[j, k]
    return out_slow

# Faster option
from numpy.core.umath_tests import inner1d
def fast_dist(a):
    mod_a = np.sqrt(inner1d(a ,a))
    norm_a = a / mod_a[:, None]
    out_fast = inner1d(norm_a[:, None, :],
                       norm_a[None, :, :])
    return out_fast

And here are the timings:

In [2]: %timeit slow_dist(a)
10 loops, best of 3: 67.6 ms per loop

In [3]: %timeit fast_dist(a)
10000 loops, best of 3: 60.5 us per loop

In [4]: np.allclose(slow_dist(a), fast_dist(a))
Out[4]: True
share|improve this answer

Your Answer


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.