# Numpy - Generalize cropping over time dimension

I have a cropping method, that works for `(N, M)` array, and I want it to work for `(T, N, M)` - see below things I've tried and don't work (hint - couldn't get `np.vectorize` to work)

This is the method

``````def crop(image: np.ndarray) -> np.ndarray:
"""
Crop a single image
"""
image_cropped = image[~np.all(image == 0, axis=1)]
image_cropped = image_cropped[:, ~np.all(image_cropped == 0, axis=0)]

return image_cropped
``````

What I tried

• `np.vectorize(crop)(sequence_of_images)` leads to this error: `numpy.AxisError: axis 1 is out of bounds for array of dimension 0`
• `np.apply_along_axis(crop, 0, sequence_of_images)` leads to this error: `numpy.AxisError: axis 1 is out of bounds for array of dimension 1`

How can I get this to work without using a loop? (It can be assumed that for each image over time dimension, the size will be equal after cropping, though the images cropping mask is not the same)

For `2D` `image`, the chained indexing could be replicated with an outer mask of rows and cols.

Thus,

``````m1 = ~np.all(image == 0, axis=1)
m2 =  ~np.all(image_cropped == 0, axis=0)

image_cropped = image[m1, :]
image_cropped = image_cropped[:, m2]
``````

would be same as :

``````image_cropped = image_cropped[outer_mask(m1, m2)]
``````

We will transfer this knowledge to `3D` case. Also, that outer mask for 3D could be easily constructed off the two maks with `keepdims=True` for the `ALL` reductions and finally using elementwise multiplication that takes care of the outer operation.

Thus, we will end up with :

``````mask_0s = image_nd == 0
``````

Finally to have 3D array output :

``````out = out.reshape(image_nd.shape[0],-1,mask2[0].sum())
``````
• Beautiful! Can you elaborate on each step please so I can understand the logic here? Jul 31, 2020 at 10:45
• @bluesummers Added some explanation. Jul 31, 2020 at 11:12