# How to get the fatest way of getting the maximum values element-wised of “n” matrices in Python/Numpy

Hey guys I'd like to know the best fatest/optimized way of getting the maximum values element-wised of "n" matrices in Python/Numpy.

For example:

import numpy as np
matrices=[np.random.random((5,5)) for i in range(10)]
# the function np.maximum from numpy only works for two matrices.
max_matrix=np.maximum(matrices[0],matrices[1])
max_matrix=np.maximum(*matrices) # <- error

How would you overcome this problem?

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Use reduce:

reduce(np.maximum, matrices)

From the docs:

reduce(function, iterable[, initializer])

Apply function of two arguments cumulatively to the items of iterable, from left to right, so as to reduce the iterable to a single value. For example, reduce(lambda x, y: x+y, [1, 2, 3, 4, 5]) calculates ((((1+2)+3)+4)+5). The left argument, x, is the accumulated value and the right argument, y, is the update value from the iterable. If the optional initializer is present, it is placed before the items of the iterable in the calculation, and serves as a default when the iterable is empty. If initializer is not given and iterable contains only one item, the first item is returned.

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+1 That's pretty awesome and is a bit faster than either Justin or my answers, especially for large matrices. –  JoshAdel Sep 30 '11 at 18:12
That was exactly what I was looking for! Thank you guys. –  Arthur Alvim Sep 30 '11 at 18:23
I find it strange that np.maximum.reduce(matrices) is slower than this. My bet is that numpy converts matrices using np.array first. –  Justin Peel Oct 1 '11 at 15:18
import numpy as np
matrices=[np.random.random((5,5)) for i in range(10)]
np.max(np.hstack(matrices))

Will give you the maximum value from all of the n matrices. This basically merges all of the matrices in matrices into a single array using np.hstack and then takes the max of that new array. This assumes that all of your matrices have the same number of rows. You can also use np.vstack or np.concatenate to achieve a similar effect.

Edit I re-read your question and you might actually want something more like:

np.max(np.dstack(matrices),axis=2)

This will stack all of your matrices along a third axis and then give you the max along that direction, returning a 5x5 matrix for your case.

Edit #2 Here are some timings:

In [33]: matrices = [np.random.random((5,5)) for i in range(10)]

In [34]: %timeit np.dstack(matrices).max(2)
10000 loops, best of 3: 92.6 us per loop

In [35]: %timeit np.array(matrices).max(axis=0)
10000 loops, best of 3: 90.9 us per loop

In [36]: %timeit reduce(np.maximum, matrices)
10000 loops, best of 3: 25.8 us per loop

and for some larger arrays:

In [37]: matrices = [np.random.random((200,200)) for i in range(100)]

In [38]: %timeit np.dstack(matrices).max(2)
10 loops, best of 3: 111 ms per loop

In [39]: %timeit np.array(matrices).max(axis=0)
1 loops, best of 3: 697 ms per loop

In [40]: %timeit reduce(np.maximum, matrices)
100 loops, best of 3: 12.7 ms per loop

Steven wins!

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The OP wants an output matrix where each element is the max of all of the elements located at that same position in the input matrices. –  Justin Peel Sep 30 '11 at 18:05
Fixed it before I saw your comment –  JoshAdel Sep 30 '11 at 18:08
+1 for the timings. –  Steven Rumbalski Sep 30 '11 at 18:22