The actual problem I wish to solve is, given a set of *N* unit vectors and another set of *M* vectors calculate for each of the unit vectors the average of the absolute value of the dot product of it with every one of the *M* vectors. Essentially this is calculating the outer product of the two matrices and summing and averaging with an absolute value stuck in-between.

For *N* and *M* not too large this is not hard and there are many ways to proceed (see below). The problem is when *N* and *M* are large the temporaries created are huge and provide a practical limitation for the provided approach. Can this calculation be done without creating temporaries? The main difficulty I have is due to the presence of the absolute value. Are there general techniques for "threading" such calculations?

As an example consider the following code

```
N = 7
M = 5
# Create the unit vectors, just so we have some examples,
# this is not meant to be elegant
phi = np.random.rand(N)*2*np.pi
ctheta = np.random.rand(N)*2 - 1
stheta = np.sqrt(1-ctheta**2)
nhat = np.array([stheta*np.cos(phi), stheta*np.sin(phi), ctheta]).T
# Create the other vectors
m = np.random.rand(M,3)
# Calculate the quantity we desire, here using broadcasting.
S = np.average(np.abs(np.sum(nhat*m[:,np.newaxis,:], axis=-1)), axis=0)
```

This is great, S is now an array of length *N* and contains the desired results. Unfortunately in the process we have created some potentially huge arrays. The result of

```
np.sum(nhat*m[:,np.newaxis,:], axis=-1)
```

is a *M* X *N* array. The final result, of course, is only of size *N*. Start increasing the sizes of *N* and *M* and we quickly run into a memory error.

As noted above, if the absolute value were not required then we could proceed as follows, now using `einsum()`

```
T = np.einsum('ik,jk,j', nhat, m, np.ones(M)) / M
```

This works and works quickly even for quite large *N* and *M* . For the specific problem I need to include the `abs()`

but a more general solution (perhaps a more general ufunc) would also be of interest.

`dot`

and some axis fiddling? – user2357112 Jul 12 '13 at 21:37`tensordot`

might be more useful. – user2357112 Jul 12 '13 at 21:40`abs()`

. If it weren't for that the`einsum()`

expression in the question would be ideal! – Craig J Copi Jul 12 '13 at 22:02`dot`

or`tensordot`

to generate the temporary passed to`abs`

, saving an order of magnitude or two of memory since you don't have to`sum`

. I doubt you'll be able to avoid the`abs`

call, though. – user2357112 Jul 12 '13 at 22:10