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# How to do this operation in numPy?

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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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
@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? – Fred Foo 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
Maybe the `cdist` function is interesting too, then. – Fred Foo 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

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

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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