In a large code base, I am using np.broadcast_to to broadcast arrays (just using simple examples here):

In : x = np.array([1,2,3])

In : y = np.broadcast_to(x, (2,1,3))

In : y.shape
Out: (2, 1, 3)

Elsewhere in the code, I use third-party functions that can operate in a vectorized way on Numpy arrays but that are not ufuncs. These functions don't understand broadcasting, which means that calling such a function on arrays like y is inefficient. Solutions such as Numpy's vectorize aren't good either because while they understand broadcasting, they introduce a for loop over the array elements which is then very inefficient.

Ideally, what I'd like to be able to do is to have a function, which we can call e.g. unbroadcast, that returns an array with a minimal shape that can be broadcasted back to the full size if needed. So e.g.:

In : z.shape
Out: (1, 1, 3)

I can then run the third-party functions on z, then broadcast the result back to y.shape.

Is there a way to implement unbroadcast that relies on Numpy's public API? If not, are there any hacks that would produce the desired result?

• Something like y[None,0]? Nov 28 '16 at 13:50
• What do you mean "minimal shape"? Won't the minimal shape in N dimensions returned by unbroadcast always be (1, 1, ..., 1) (or even (1,) )? Nov 28 '16 at 13:53
• I mean the minimal shape that still contains all the required data to broadcast it back to the full array. So in the example above, z.shape is (1,1,3) not (1,1,1). Nov 28 '16 at 13:56

I have a possible solution, so will post it here (however if anyone has a better one, please feel free to reply too!). One solution is to check the strides argument of arrays, which will be 0 along broadcasted dimensions:

slices = []
for i in range(array.ndim):
if array.strides[i] == 0:
slices.append(slice(0, 1))
else:
slices.append(slice(None))
return array[slices]

This gives:

Out: (1, 1, 3)

This is probably equivalent to your own solution, only a bit more built-in. It uses as_strided in numpy.lib.stride_tricks:

import numpy as np
from numpy.lib.stride_tricks import as_strided

x = np.arange(16).reshape(2,1,8,1)  # shape (2,1,8,1)