# Create array of outer products in numpy

I have an array of n vectors of length m. For example, with n = 3, m = 2:

``````x = array([[1, 2], [3, 4], [5,6]])
``````

I want to take the outer product of each vector with itself, then concatenate them into an array of square matrices of shape (n, m, m). So for the `x` above I would get

``````array([[[ 1,  2],
[ 2,  4]],

[[ 9, 12],
[12, 16]],

[[25, 30],
[30, 36]]])
``````

I can do this with a `for` loop like so

``````np.concatenate([np.outer(v, v) for v in x]).reshape(3, 2, 2)
``````

Is there a numpy expression that does this without the Python `for` loop?

Bonus question: since the outer products are symmetric, I don't need to m x m multiplication operations to calculate them. Can I get this symmetry optimization from numpy?

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Maybe use `einsum`?

``````>>> x = np.array([[1, 2], [3, 4], [5,6]])
>>> np.einsum('ij...,i...->ij...',x,x)
array([[[ 1,  2],
[ 2,  4]],

[[ 9, 12],
[12, 16]],

[[25, 30],
[30, 36]]])
``````
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normally I would put the `...` to the left: `np.einsum('...i,...j->...ij',x,x)` – seberg Aug 18 '13 at 22:15

I used the following snippet when I was trying to do the same in Theano:

``````def multiouter(A,B):
'''Provided NxK (Theano) matrices A and B it returns a NxKxK tensor C with C[i,:,:]=A[i,:]*B[i,:].T'''
return A.dimshuffle(0,1,'x')*B.dimshuffle(0,'x',1)
``````

Doing a straighforward conversion to Numpy yields

``````def multiouter(A,B):
'''Provided NxK (Numpy) arrays A and B it returns a NxKxK tensor C with C[i,:,:]=A[i,:]*B[i,:].T'''
return A[:,:,None]*B[:,None,:]
``````

I think I got the inspiration for it from another StackOverflow posting, so I am not sure I can take all the credit.

Note: indexing with `None` is equivalent to indexing with `np.newaxis` and instantiates a new axis with dimension 1.

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