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How to vectorize this python code?

I am trying to use NumPy and vectorization operations to make a section of code run faster. I appear to have a misunderstanding of how to vectorize this code, however (probably due to an incomplete understanding of vectorization).

Here's the working code with loops (A and B are 2D arrays of a set size, already initialized):

``````for k in range(num_v):
B[:] = A[:]
for i in range(num_v):
for j in range(num_v):
A[i][j] = min(B[i][j], B[i][k] + B[k][j])
return A
``````

And here is my attempt at vectorizing the above code:

``````for k in range(num_v):
B = numpy.copy(A)
A = numpy.minimum(B, B[:,k] + B[k,:])
return A
``````

For testing these, I used the following, with the code above wrapped in a function called 'algorithm':

``````def setup_array(edges, num_v):
r = range(1, num_v + 1)
A = [[None for x in r] for y in r]  # or (numpy.ones((num_v, num_v)) * 1e10) for numpy
for i in r:
for j in r:
val = 1e10
if i == j:
val = 0
elif (i,j) in edges:
val = edges[(i,j)]
A[i-1][j-1] = val
return A

A = setup_array({(1, 2): 2, (6, 4): 1, (3, 2): -3, (1, 3): 5, (3, 6): 5, (4, 5): 2, (3, 1): 4, (4, 3): 8, (3, 4): 6, (2, 4): -4, (6, 5): -5}, 6)
B = []
algorithm(A, B, 6)
``````

The expected outcome, and what I get with the first code is:

``````[[0, 2, 5, -2, 0, 10]
[8, 0, 4, -4, -2, 9]
[4, -3, 0, -7, -5, 5]
[12, 5, 8, 0, 2, 13]
[10000000000.0, 9999999997.0, 10000000000.0, 9999999993.0, 0, 10000000000.0]
[13, 6, 9, 1, -5, 0]]
``````

The second (vectorized) function instead returns:

``````[[ 0. -4.  0.  0.  0.  0.]
[ 0. -4.  0. -4.  0.  0.]
[ 0. -4.  0.  0.  0.  0.]
[ 0. -4.  0.  0.  0.  0.]
[ 0. -4.  0.  0.  0.  0.]
[ 0. -4.  0.  0. -5.  0.]]
``````

What am I missing?

-

The problem is caused by array broadcasting in the line:

``````A = numpy.minimum(B, B[:,k] + B[k,:])
``````

B is size 6 by 6, B[:,k] is an array with 6 elements, B[k,:] is an array with 6 elements.

(Because you are using the numpy array type, both B[:,k] and B[k,:] return a rank-1 array of shape N)

Numpy automatically changes the sizes to match:

1. First B[:,k] is added to B[k,:] to make an intermediate array result with 6 elements. (This is not what you intended)
2. Second this 6 element array is broadcast to a 6 by 6 matrix by repeating the rows
3. Third the minimum of the original matrix and this broadcast matrix is computed.

This means that your numpy code is equivalent to:

``````for k in range(num_v):
B[:] = A[:]
C=[B[i][k]+B[k][i] for i in range(num_v)]
for i in range(num_v):
for j in range(num_v):
A[i][j] = min(B[i][j], C[j])
``````

The easiest way to fix your code is to use the matrix type instead of the array type:

``````A = numpy.matrix(A)
for k in range(num_v):
A = numpy.minimum(A, A[:,k] + A[k,:])
``````

The matrix type uses stricter broadcasting rules so in this case:

1. A[:,k] is extended to a 6 by 6 matrix by repeating columns
2. A[k,:] is extended to a 6 by 6 matrix by repeating rows
3. The broadcasted matrices are added together to make a 6 by 6 matrix
4. The minimum is applied
-
Great explanation, thanks! I can't believe how much faster my code is now! That change alone took the entire code run (on different data) down from 45 minutes to under a second. – Kristen Jan 22 '13 at 2:54

Usually you want to vectorize code because you think it is running too slow.
If your code is too slow, then I can tell you that proper indexing will make it faster.
Instead of `A[i][j]` you should write `A[i, j]` -- this avoids a transient copy of a (sub)array.
Since you do this in the inner-most loop of your code this might be very costly.

Look here:

``````In [37]: timeit test[2][2]
1000000 loops, best of 3: 1.5 us per loop

In [38]: timeit test[2,2]
1000000 loops, best of 3: 639 ns per loop
``````

Having said that...

... here's my take on how to vectorize

``````for k in range(num_v):