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I have a collection of n dimensional points and I want to find which 2 are the closest. The best I could come up for 2 dimensions is:

from numpy import *
myArr = array( [[1, 2],
                [3, 4],
                [5, 6],
                [7, 8]] )

n = myArr.shape[0]
cross = [[sum( ( myArr[i] - myArr[j] ) ** 2 ), i, j]
         for i in xrange( n )
         for j in xrange( n )
         if i != j

print min( cross )

which gives

[8, 0, 1]

But this is too slow for large arrays. What kind of optimisation can I apply to it?


Euclidean distance between points in two different Numpy arrays, not within

share|improve this question
@Ηλίας: Roughly how many points do you have? Please note that it's possible to have a set more than 2 points (even all the points) with the same distances (but inaccurate computations may not reflect this, so eventually you need to be able to set a threshold trh where distance differences below trh are considered equal). You are not interested to find out closest point to a given one? – eat Feb 25 '11 at 20:31
@eat It is a hierarchy cluster that I am building, and I need to find the two closest centroids. Normally less than a thousand points, but I need to see how much it can scale. Rounding errors, won't be that important in my case. – Ηλίας Feb 25 '11 at 20:57
up vote 11 down vote accepted

Try scipy.spatial.distance.pdist(myArr). This will give you a condensed distance matrix. You can use argmin on it and find the index of the smallest value. This can be converted into the pair information.

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What is the easiest way to get those coordinates from that single integer? – Ηλίας Feb 25 '11 at 18:58
@Ηλίας You can use np.unravel_index(np.argmin(distances), distances.shape) if distances contains the result of the pdist call above. – sffc Jun 19 '15 at 0:53
It gives me a stomachache to use this method for finding closest pairs in O(N^2) time, because the divide-and-conquer O(N log N) solution was literally the first algorithm I learned in my algorithms class in school. But this is just so much easier to implement and it works fine for a small enough set. – sffc Jun 19 '15 at 0:56

There's a whole Wikipedia page on just this problem, see: http://en.wikipedia.org/wiki/Closest_pair_of_points

Executive summary: you can achieve O(n log n) with a recursive divide and conquer algorithm (outlined on the Wiki page, above).

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Neat! I'm glad I hit refresh before writing: "Obviously the complexity is O(n^2)" ;o) – das_weezul Feb 25 '11 at 16:27
Great. If the points are to be added successively, and the minimum distance pair is to be updated, then maintaining a Delaunay triangulation structure is efficient. – Alexandre C. Feb 25 '11 at 16:28

You could take advantage of the latest version of SciPy's (v0.9) Delaunay triangulation tools. You can be sure that the closest two points will be an edge of a simplex in the triangulation, which is a much smaller subset of pairs than doing every combination.

Here's the code (updated for general N-D):

import numpy
from scipy import spatial

def closest_pts(pts):
    # set up the triangluataion
    # let Delaunay do the heavy lifting
    mesh = spatial.Delaunay(pts)

    # TODO: eliminate reduncant edges (numpy.unique?)
    edges = numpy.vstack((mesh.vertices[:,:dim], mesh.vertices[:,-dim:]))

    # the rest is easy
    x = mesh.points[edges[:,0]]
    y = mesh.points[edges[:,1]]

    dists = numpy.sum((x-y)**2, 1)
    idx = numpy.argmin(dists)

    return edges[idx]
    #print 'distance: ', dists[idx]
    #print 'coords:\n', pts[closest_verts]

dim = 3
N = 1000*dim
pts = numpy.random.random(N).reshape(N/dim, dim)

Seems closely O(n):

enter image description here

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May actually work in 2D. Have you made any timings? However this approach fails miserable in higher dim. Thanks – eat Feb 25 '11 at 21:31
@eat: why do you say it "fails miserably"? 3D is 4-5X slower than the same N in 2D. But any approach (except for the naive brute approach) is going to see slowdowns with D. – Paul Feb 25 '11 at 21:56
Well, it's kind of pointless to try to do Delaunay triangulation in 123D! So this won't solve OP's question (unless his nD is 2 or 3). Don't get me wrong, I'm actually very happy that scipy is able to perform Delaunay triangulation so fast. Please make some timings with pdist for n= 2...123, you'll see. Thanks – eat Feb 25 '11 at 22:16
@eat: I missed the fact that the OP wanted a general N-D solution, I was under the impression it was strictly 2D. I'm a little "bridge-and-tunnel" and sometimes consider 3D not only as "high dimensional", but the highest! – Paul Feb 26 '11 at 0:59

There is a scipy function pdist that will get you the pairwise distances between points in an array in a fairly efficient manner:


that outputs the N*(N-1)/2 unique pairs (since r_ij == r_ji). You can then search on the minimum value and avoid the whole loop mess in your code.

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Perhaps you could proceed along these lines:

In []: from scipy.spatial.distance import pdist as pd, squareform as sf
In []: m= 1234
In []: n= 123
In []: p= randn(m, n)
In []: d= sf(pd(p))
In []: a= arange(m)
In []: d[a, a]= d.max()
In []: where(d< d.min()+ 1e-9)
Out[]: (array([701, 730]), array([730, 701]))

With substantially more points you need to be able to somehow utilize the hierarchical structure of your clustering.

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How fast is it compared to just doing a nested loop and keeping track of the shortest pair? I think creating a huge cross array is what might be hurting you. Even O(n^2) is still pretty quick if you're only doing 2 dimensional points.

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It helps, but quickly degenerates for large matrices – Ηλίας Feb 25 '11 at 16:43

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