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I have an array X of 3D coords of N points (N*3) and want to calculate the eukledian distance between each pair of points.

I can do this by iterating over X and comparing them with the threshold.

coords = array([v.xyz for v in vertices])
for vertice in vertices:
    tests = np.sum(array(coords - vertice.xyz) ** 2, 1) < threshold
    closest = [v for v, t in zip(vertices, tests) if t]

Is this possible to do in one operation? I recall linear algebra from 10 years ago and can't find a way to do this.

Probably this should be a 3D array (point a, point b, axis) and then summed by axis dimension.

edit: found the solution myself, but it doesn't work on big datasets.

    coords = array([v.xyz for v in vertices])
    big = np.repeat(array([coords]), len(coords), 0)
    big_same = np.swapaxes(big, 0, 1)
    tests = np.sum((big - big_same) ** 2, 0) < thr_square

    for v, test_vector in zip(vertices, tests):
        v.closest = self.filter(vertices, test_vector)
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3 Answers

up vote 2 down vote accepted

Use scipy.spatial.distance. If X is an n×3 array of points, you can get an n×n distance matrix from

from scipy.spatial import distance
D = distance.squareform(distance.pdist(X))

Then, the closest to point i is the point with index

np.argsort(D[i])[1]

(The [1] skips over the value in the diagonal, which will be returned first.)

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Can it sustain 70k points? –  culebrón Mar 14 '12 at 19:49
1  
@culebrón: never mind my previous comment (now deleted). The problem at that scale is memory; you're going to need GBs for the distance matrix. However, if you don't use scipy.spatial.distance, the problem is going to be CPU time. What exactly do you need to do with the distances? –  larsmans Mar 14 '12 at 19:58
    
I need to find the points within a threshold from each one, to cluster them. –  culebrón Mar 14 '12 at 20:02
2  
Maybe the cdist function is interesting too, then. –  larsmans Mar 14 '12 at 20:09
    
I'll try. I tested scipy-cluster, it worked fine on very simple data (10 points), but on a small test file (1K points) it already failed. Thanks anyway. –  culebrón Mar 14 '12 at 20:14
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I'm not quite sure what you're asking here. If you're computing the Euclidean distance between each pair of points in an N-point space, it would make sense to me to represent the results as a look-up matrix. So for N points, you'd get an NxN symmetric matrix. Element (3, 5) would represent the distance between points 3 and 5, whereas element (2, 2) would be the distance between point 2 and itself (zero). This is how I would do it for random points:

import numpy as np

N = 5 

coords = np.array([np.random.rand(3) for _ in range(N)])
dist = np.zeros((N, N)) 

for i in range(N):
    for j in range(i, N): 
        dist[i, j] = np.linalg.norm(coords[i] - coords[j])
        dist[j, i] = dist[i, j]

print dist
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This is not what I need, because I tested the algorithm with cProfile. linalg.norm is VERY slow. Cycles are very slow too. Bulk operations on np.arrays are times as fast. –  culebrón Mar 14 '12 at 18:37
    
What sort of bulk operations are you referring to? –  Brendan Wood Mar 14 '12 at 19:15
    
np.sum(array(coords - vertice.xyz) ** 2, 1) < threshold for example. It calculates the square of euclidean distance and compares it to a threshold. The result is an array of Booleans, indicating which vertices of the list are closer than the threshold to the current. –  culebrón Mar 14 '12 at 19:49
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If xyz is the array with your coordinates, then the following code will compute the distance matrix (works fast till the moment when you have enough memory to store N^2 distances):

xyz = np.random.uniform(size=(1000,3))
distances = (sum([(xyzs[:,i][:,None]-xyzs[:,i][None,:])**2 for i in range(3)]))**.5
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