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considering I have a 3D histogram or for simplicity a 3D numpy array of shape (X,Y,Z)

import numpy as np
array = np.random.random((100,100,100))

What is the best way, using numpy or scipy to obtain array's values' indexes of which satisfy a sphere conditions?

(index_x**2 + index_y**2 + index_z**2) <= radius**2

Obvioulsy, in the later condition, the array center is (0, 0, 0). In general the condition will be

((index_x-center_x)**2 + (index_y-center_y)**2 +(index_z-center_z)**2) <= radius**2

The problem is easy to solve using simply a python loop, but I need that to be optimized.

many thanks for your help

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You may consider accepting one of the answers: this will increase your accept rate, and make reader more willing to answer your next questions. :) –  EOL Nov 25 '12 at 10:22

2 Answers 2

You can first efficiently get the indexes with ogrid() and then obtain the indexes that satisfy your condition with nonzero().

Getting the indexes can be obtained with nonzero() like so:

indexes = numpy.transpose((x**2+y**2+z**2 <= radius**2).nonzero())  # transpose() might be unnecessary: it depends on your needs

where the indexes arrays are obtained efficiently with ogrid():

x, y, z = numpy.ogrid[:100, :100, :100]

or, for an arbitrary shape for your input data array:

x, y, z = ogrid[tuple(slice(None, dim) for dim in data.shape)]
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fantastic ... I thought of using ogrid but didn't know it works in multi-dimensions thank you very much –  Cobry Nov 16 '12 at 10:09
up vote 1 down vote accepted

Just for making @EOL nice approach more general, one can define a center within the shape of the array

array = np.random.random((100,100,100))
center = (30,10,25)
radius = 5.0
x, y, z = np.ogrid[-center[0]:array.shape[0]-center[0],-center[1] :array.shape[1]-center[1], -center[2]:array.shape[2]-center[2]]
indexes = numpy.transpose((x**2+y**2+z**2 <= radius**2).nonzero())
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