Efficient way to apply function to each 2D slice of 3D numpy array

I want to apply a function that takes a 2D array (and returns one of the same shape) to each 2D slice of a 3D array. What's an efficient way of doing this? `numpy.fromiter` returns a 1D array and `numpy.fromfunction` needs to be applied to each coordinate individually.

Currently I am doing

``````foo = np.array([func(arg, bar2D) for bar2D in bar3D])
``````

This gives me what I want, but the list comprehension is very slow. Also, `func` is a 1D derivative with particular boundary conditions. `numpy.gradient` only seems to do N-D derivatives with N the dimension of the array, but maybe there is another routine that will do the whole thing for me?

Edit: The list comprehension works, but I'm looking for a faster way of doing it. `bar3D` can be large, up to `(500,500,1000)`. All the `numpy` routines I've found for applying functions to arrays seem to assume either the function or the array are 1D.

I don't know of any generic way to apply functions to N-D slices of arrays. But there are two ways to get around it.

If what you want to do is apply a 1D derivative on each row or column of each 2D-slice, this is equivalent to applying the derivative to each 1D slice, and you can use np.apply_along_axis:

``````values = np.arange(4)*np.arange(3)[:, None]+np.arange(2)[:, None, None]*2
>>> array([[[0, 0, 0, 0],
[0, 1, 2, 3],
[0, 2, 4, 6]],

[[2, 2, 2, 2],
[2, 3, 4, 5],
[2, 4, 6, 8]]])

>>> array([[[ 0.,  0.,  0.,  0.],
[ 1.,  1.,  1.,  1.],
[ 2.,  2.,  2.,  2.]],

[[ 0.,  0.,  0.,  0.],
[ 1.,  1.,  1.,  1.],
[ 2.,  2.,  2.,  2.]]])
``````

This differentiates the rows of each 2D slice. To differantiate each column do `np.apply_along_axis(np.gradient, 2, values)`

If you want to do something that requires two dimensions, you can usually get it through broadcasting and axis parameters. If for instance you want `V[i, j] = sqrt((V[i,j]-V[i, j-1])^2+V[i, j]-V[i-1, j])^2` for each slice `V` you can do:

``````xdiffs = np.zeros_like(values)
xdiffs[:, 1:, :]= np.diff(values, axis=1)

ydiffs = np.zeros_like(values)
ydiffs[:, :, 1:] = np.diff(values, axis=2)

diffnorms = np.linalg.norm(xdiffs, ydiffs)

>>> array(
[[[ 0.        ,  0.        ,  0.        ,  0.        ],
[ 0.        ,  1.41421356,  2.23606798,  3.16227766],
[ 0.        ,  2.23606798,  2.82842712,  3.60555128]],

[[ 0.        ,  0.        ,  0.        ,  0.        ],
[ 0.        ,  1.41421356,  2.23606798,  3.16227766],
[ 0.        ,  2.23606798,  2.82842712,  3.60555128]]])
``````

It's a bit cumbersome to get the dimensions right, but it will usually be the most efficient solution.

This examples uses zeros at the boundries, if you need something else, you need to set `normdiff[:, :, 0]` and `normdiff[:, 0, :]` to the correct boundry values.

Say you have an array, a:

``````>>> a=np.random.random((4,3,2))

array([[[ 0.27252091,  0.78545835],
[ 0.83604934,  0.48509821],
[ 0.77828735,  0.26630055]],

[[ 0.98623474,  0.29839813],
[ 0.15893604,  0.61870988],
[ 0.62281607,  0.27193647]],

[[ 0.47976331,  0.2471835 ],
[ 0.77323041,  0.30137068],
[ 0.52906156,  0.53950597]],

[[ 0.59207654,  0.86355457],
[ 0.50250812,  0.75688653],
[ 0.91046136,  0.5785383 ]]])
``````

You can access 2D slices like so:

``````>>> for x in range(a.shape[0]):
print a[x,:,:]

>>> for x in range(a.shape[1]):
print a[:,x,:]

>>> for x in range(a.shape[2]):
print a[:,:,x]
``````
• Sorry, this isn't really what I'm after. I know how to take slices (`for bar2D in bar3D` gives me each 2D slice). What I want to do is apply a function to each 2D slice and create a new array from that. Commented May 5, 2014 at 10:57
• you could create another array, say `b`, of the same shape as `a` and then, in place of `print a[x,:,:]`, do `b[x,:,:]=yourfunc(a[x,:,:])`.
– Lee
Commented May 5, 2014 at 11:02
• That's equivalent to what I'm currently doing. Actually, it's even slower than the list comprehension. I'm asking for an efficient way to do this for large 3D arrays. Commented May 5, 2014 at 11:19