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I'm beginning to learn Python coming from a C++ background. What I am looking for is a quick and easy way to find the closest (nearest neighbor) of some multidimensional query point in an 2D (numpy) array of multidimensional points (also numpy arrays). I know that scipy has a k-d tree, but I don't think this is what I want. First of all, I will be changing the values of the multidimensional points in the 2D array. Secondly, the position (coordinates) of each point in the 2D array matters as I will also be changing their neighbors.

I could write a function that goes through the 2D array and measures the distance between the query point and the points in the array while keeping track of the smallest one (using a scipy spatial distance function to measure distance). Is there is a built in function that does this? I am trying to avoid iterating over arrays in python as much as possible. I will also have numerous query points so there would be at least two "for loops" - one to iterate through the query points and for each query, a loop to iterate through the 2D array and find the minimum distance.

Thanks for any advice.

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4 Answers 4

If concise is your goal, you can do this one-liner:

In [14]: X = scipy.randn(10,2)

In [15]: X
Out[15]: 
array([[ 0.85831163,  1.45039761],
       [ 0.91590236, -0.64937523],
       [-1.19610431, -1.07731673],
       [-0.48454195,  1.64276509],
       [ 0.90944798, -0.42998205],
       [-1.17765553,  0.20858178],
       [-0.29433563, -0.8737285 ],
       [ 0.5115424 , -0.50863231],
       [-0.73882547, -0.52016481],
       [-0.14366935, -0.96248649]])

In [16]: q = scipy.array([0.91, -0.43])

In [17]: scipy.argmin([scipy.inner(q-x,q-x) for x in X])
Out[17]: 4

If you have several query points:

In [18]: Q = scipy.array([[0.91, -0.43], [-0.14, -0.96]])

In [19]: [scipy.argmin([scipy.inner(q-x,q-x) for x in X]) for q in Q]
Out[19]: [4, 9]
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Broadcasting is very useful for this kind of thing. I'm not sure if this is what you need, but here I use broadcasting to find the displacement between p (one point in 3 space) and X (a set of 10 points in 3-space).

import numpy as np

def closest(X, p):
    disp = X - p
    return np.argmin((disp*disp).sum(1))

X = np.random.random((10, 3))
p = np.random.random(3)

print X
#array([[ 0.68395953,  0.97882991,  0.68826511],
#       [ 0.57938059,  0.24713904,  0.32822283],
#       [ 0.06070267,  0.06561339,  0.62241713],
#       [ 0.93734468,  0.73026772,  0.33755815],
#       [ 0.29370809,  0.76298588,  0.68728743],
#       [ 0.66248449,  0.6023311 ,  0.76704199],
#       [ 0.53490144,  0.96555923,  0.43994738],
#       [ 0.23780428,  0.75525843,  0.46067472],
#       [ 0.84240565,  0.82573202,  0.56029917],
#       [ 0.66751884,  0.31561133,  0.19244683]])
print p
#array([ 0.587416 ,  0.4181857,  0.2539029])
print closest(X, p)
#9
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You can compute all distances scipy.spatial.distance.cdist( X, Y ) or use RTree for dynamic data: http://gispython.org/rtree/docs/class.html .

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I like the first suggestion, but I am doing one query at a time and updating values in the array (similar to SOM). I could use cdist(X,Y) where X is just one query and update the array and move on to the next query. Rtree seems like it might be OK, but I'm a bit unsure of how to use it in my situation. I wonder if there are any graph packages that would allow for a nearest neighbor search with an outside point? I could use a graph package to make a lattice where each node is an multidimensional point. Some of the other features of a graph package would come in handy in my program –  COM Dec 16 '11 at 2:06

I am currently working on a project that needs me to do find k-NN'th neighbour and I found this article especially helpful. It is very similar to Bi Roco's answer, but reaches the same goal differently.

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