This question has been asked before, but the solution only works for 1D/2D arrays, and I need a more general answer.

How do you create a repeating array without replicating the data? This strikes me as something of general use, as it would help to vectorize python operations without the memory hit.

More specifically, I have a (y,x) array, which I want to tile multiple times to create a (z,y,x) array. I can do this with numpy.tile(array, (nz,1,1)), but I run out of memory. My specific case has x=1500, y=2000, z=700.

  • 1
    What are you going to do with larger array? array[None,:,:] may be just as useful as the tiled array. Unless you do some sort of dot product on the y or x dimension, you could still end up with memory error.
    – hpaulj
    May 16, 2014 at 21:33
  • I have to apply a geographical mask to a geophysical dataset in the form (time, y, x). The module I'm using requires that the mask be the same shape as the dataset, which is why I need to replicate the (y,x) mask onto the time dimension. May 19, 2014 at 8:51

1 Answer 1


One simple trick is to use np.broadcast_arrays to broadcast your (x, y) against a z-long vector in the first dimension:

import numpy as np

M = np.arange(1500*2000).reshape(1500, 2000)
z = np.zeros(700)

# broadcasting over the first dimension
_, M_broadcast = np.broadcast_arrays(z[:, None, None], M[None, ...])

print M_broadcast.shape, M_broadcast.flags.owndata
# (700, 1500, 2000), False

To generalize the stride_tricks method given for a 1D array in this answer, you just need to include the shape and stride length for each dimension of your output array:

M_strided = np.lib.stride_tricks.as_strided(
                M,                              # input array
                (700, M.shape[0], M.shape[1]),  # output dimensions
                (0, M.strides[0], M.strides[1]) # stride length in bytes
  • The broadcasting thing does exactly what I wanted. It seems to me as simpler/more logical than the stride_tricks method. May 19, 2014 at 8:49
  • Internally broadcast_arrays uses as_strided in exactly this way. Look in numpy/lib/stride_tricks.py. It's the 0 stride length for the first dimension that does the trick.
    – hpaulj
    May 19, 2014 at 16:20
  • The stride length in bytes line should be (0, M.strides[0], M.strides[1])
    – hpaulj
    May 19, 2014 at 16:39
  • @hpaulj that's interesting to know, although I'm sure that that using stride_tricks directly is still more efficient than allocating another array just to broadcast against.
    – ali_m
    May 19, 2014 at 16:40
  • M[None,:,:] has shape: (1,...) and strides: (0,..). Same strides, but just a 1 in the new shape dimension.
    – hpaulj
    May 20, 2014 at 2:04

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