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

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

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

In [3]: y.shape
Out[3]: (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 [4]: z = unbroadcast(y)

In [5]: z.shape
Out[5]: (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]?
    – Divakar
    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,) )?
    – Alex Riley
    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).
    – astrofrog
    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:

def unbroadcast(array):
    slices = []
    for i in range(array.ndim):
        if array.strides[i] == 0:
            slices.append(slice(0, 1))
    return array[slices]

This gives:

In [14]: unbroadcast(y).shape
Out[14]: (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)
y = np.broadcast_to(x,(2,3,8,5))    # shape (2,3,8,5) broadcast

def unbroadcast(arr):
    #determine unbroadcast shape
    newshape = np.where(np.array(arr.strides) == 0,1,arr.shape) # [2,1,8,1], thanks to @Divakar
    return as_strided(arr,shape=newshape)    # strides are automatically set here

z = unbroadcast(x)
np.all(z==x)  # is True

Note that in my original answer I didn't define a function, and the resulting z array had (64,0,8,0) as strides, whereas the input has (64,64,8,8). In the current version the returned z array has identical strides to x, I guess passing and returning the array forces a creation of a copy. Anyway, we could always set the strides manually in as_strided to get identical arrays under all circumstances, but this doesn't seem necessary in the above setup.

  • 1
    Or np.where(np.array(y.strides) == 0,1,y.shape) for the newshape?
    – Divakar
    Nov 28 '16 at 14:13
  • @Divakar right, I keep forgetting np.where:) Obviously that's the numpy-idiomatic version, thank you. Nov 28 '16 at 14:14
  • For posterity, it might be nice to edit this to make the two key lines into an 'unbroadcast' function?
    – astrofrog
    Nov 28 '16 at 16:16
  • @astrofrog thanks, I was hoping that anybody trying to do this can turn it into a function;) Anyway, I edited my answer. Turns out that this results in an array that has the same strides as x. Nov 28 '16 at 16:27

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