Issue
This is somewhat related to Numpy: cartesian product of x and y array points into single array of 2D points
I'm looking for a concise way to create a cartesian product of two arrays with arbitrary dimensionality.
Examples:
Similar to the related thread, I want
x = numpy.array([1,2,3]) #ndim 1
y = numpy.array([4,5]) #ndim 1
cartesian_product(x,y) == numpy.array([[[1, 4],
[2, 4],
[3, 4]],
[[1, 5],
[2, 5],
[3, 5]]]) #ndim "2" = ndim x + ndim y
The resulting array is 2 dimensional because [1, 4], [2, 4], etc. are coordinates and hence not a true dimension. To generalise, it might be better to write x/y as [[1], [2], [3]].
The above is equal to
numpy.dstack(numpy.meshgrid(x,y))
But I also want
x2 = numpy.array([[1,1], [2,2], [3,3]]) #ndim "1", since [1, 1] is a coordinate
cartesian_product(x2,y) == numpy.array([[[1, 1, 4],
[2, 2, 4],
[3, 3, 4]],
[[1, 1, 5],
[2, 2, 5],
[3, 3, 5]]]) #ndim 2 = ndim x2 + ndim y
y2 = numpy.array([[10, 11], [20, 21]]) #ndim 1
(cartesian_product(x2, y2) ==
numpy.array([[[1, 1, 10, 11],
[2, 2, 10, 11],
[3, 3, 10, 11]],
[[1, 1, 20, 21],
[2, 2, 20, 21],
[3, 3, 20, 21]]])) #ndim x2 + ndim y2
x3 = numpy.array([[[1, 2], [3, 4]], [[5, 6], [7, 8]]]) #ndim 2
(cartesian_product(x3, y) ==
numpy.array([[[[1, 2, 4], [3, 4, 4]], [[5, 6, 4], [7, 8, 4]]],
[[[1, 2, 5], [3, 4, 5]], [[5, 6, 5], [7, 8, 5]]]]) #ndim 3
To visualise what I'm trying to do: As I said, [[0, 0], [0, 1], [1, 1], [1, 0]] should be interpreted as a 1-dimensional list of coordinates, which corresponds to a line. If I then do a cartesian product with [1, 2, 3, 4], I'm extruding this line in the z-direction, turning into a surface (i.e. 2-dimensional). But now the array will of course be 3-dimensional.
I suppose I can find away to solve this with loops, but is there any way to achieve this with numpy/scipy tools?
Solution
A memory efficient way is broadcasted assignment:
def cartesian_product(x, y):
if x.ndim < 2:
x = np.atleast_2d(x).T
if y.ndim < 2:
y = np.atleast_2d(y).T
sx, sy = x.shape, y.shape
sz = sy[:-1] + sx[:-1] + (sy[-1] + sx[-1],)
z = np.empty(sz, np.result_type(x, y))
# Broadcasted assignment
z[...,:sx[-1]] = x
z[...,sx[-1]:] = y.reshape(sy[:-1] + (x.ndim-1)*(1,) + (sy[-1],))
return z
In case you need the details on broadcasting, this page has you covered.
Answered By - user6758673
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