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I have a large (100K by 30K) and (very) sparse dataset in svmlight format which I load as follows:

import numpy as np
from scipy.cluster.vq import kmeans2
from scipy.spatial.distance import pdist, squareform
from sklearn.datasets import load_svmlight_file

X,Y = load_svmlight_file("somefile_svm.txt")

which returns a sparse scipy array X

I simply need to compute the pairwise distances of all training points as

D = pdist(X)

Unfortunately, distance computation implementations in scipy.spatial.distance work only for dense matrices. Due to the size of the dataset it is infeasible to, say, use pdist as

D = pdist(X.todense())

Any pointers to sparse matrix distance computation implementations or workarounds with regards to this problem will be greatly appreciated.

Many thanks

1 Answer 1

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In scikit-learn there is a sklearn.metrics.euclidean_distances function that works both for sparse matrices and dense numpy arrays. See the reference documentation.

However non-euclidean distances are not yet implemented for sparse matrices.

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  • Thank you for your answer. At first it seemed as a solution to my problem since "euclidean_distances" works with sparse data, however even with D=euclidean_distances(X, X) I get an out of memory error.
    – Nicholas
    Jan 22, 2012 at 16:10
  • @Nicholas: euclidean_distances necessarily returns an X.shape[0] × X.shape[0] dense array, which is 1e10 in your case.
    – Fred Foo
    Jan 22, 2012 at 17:21
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    @Nicholas if you want to implement k-means on a large dataset (in the direction X.shape[0]), you should try the sklearn.cluster.MiniBatchKMeans class). It processes the input set incrementally by small chunks hence the memory usage is controlled.
    – ogrisel
    Jan 22, 2012 at 18:31
  • Actually it's not k-means that I want to implement in python (there exist many efficient sparse implementations in C), but rather to implement measures that evaluate the quality of a clustering result. To this end, the simplicity of creating a python script would come handy but is seems that it cannot handle the memory requirements for my problem. Many thanks for all the answers!
    – Nicholas
    Jan 23, 2012 at 8:50
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    If you data is very sparse and your rows are positive and normalized you can compute the sparse matrix of the dot product A * A. If the data is sparse enough that will fit in memory. The euclidean distances can then be implicitly defined element wise by 2 - 2 * A * A.
    – ogrisel
    Jan 25, 2012 at 22:30

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