# fastest way to find euclidean distance in python

I have 2 sets of 2D points (A and B), each set have about 540 points. I need to find the points in set B that are farther than a defined distance alpha from all the points in A.

I have a solution, but is not fast enough

``````# find the closest point of each of the new point to the target set
def find_closest_point( self, A, B):
outliers = []
for i in range(len(B)):
# find all the euclidean distances
temp = distance.cdist([B[i]],A)
minimum = numpy.min(temp)
# if point is too far away from the rest is consider outlier
if minimum > self.alpha :
outliers.append([i, B[i]])
else:
continue
return outliers
``````

I am using python 2.7 with numpy and scipy. Is there another way to do this that I may gain a considerable increase in speed?

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–  Inbar Rose Oct 20 '13 at 9:21
Since you seem to look for outliers only, which is a nearest neighbour search. I think you can (and should) use `scipy.spatial.KDTree` (the old cKDTree probably does not support that, so use a newer scipy where cKDTree does). –  seberg Oct 20 '13 at 10:09
–  ali_m Oct 20 '13 at 11:07

``````>>> from scipy.spatial.distance import cdist
>>> A = np.random.randn(540, 2)
>>> B = np.random.randn(540, 2)
>>> alpha = 1.
>>> ind = np.all(cdist(A, B) > alpha, axis=0)
>>> outliers = B[ind]
``````

gives you the points you want.

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Actually this gives me a set of True and False, though I think that I got an idea of what you wanted to do, and actually is a huge speed improvement. –  api55 Oct 20 '13 at 9:58
@api55: updated the answer. –  larsmans Oct 20 '13 at 10:05
now it works fine, and i got a big increase in speed aprox. from 9.5 to 0.6 for 10 tries of the whole algorithm, thank you –  api55 Oct 20 '13 at 10:20