Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Let's say we have two matrices A and B and let matrix C be A*B (matrix multiplication not element-wise). We wish to get only the diagonal entries of C, which can be done via np.diagonal(C). However, this causes unnecessary time overhead, because we are multiplying A with B even though we only need the the multiplications of each row in A with the column of B that has the same 'id', that is row 1 of A with column 1 of B, row 2 of A with column 2 of B and so on: the multiplications that form the diagonal of C. Is there a way to efficiently achieve that using Numpy? I want to avoid using loops to control which row is multiplied with which column, instead, I wish for a built-in numpy method that does this kind of operation to optimize performance.

Thanks in advance..

share|improve this question
    
Just a note for anybody looking at this: A*B in NumPy is element-wise multiplication, not matrix multiplication (which is a.dot(b)). –  Blair Jul 3 '13 at 0:34
    
are A and B of type ndarray or matrix? –  Bitwise Jul 3 '13 at 0:47
    
@Blair, that's the case if A and B are numpy.array. If they are numpy.matrix, you can use A*B –  gnibbler Jul 3 '13 at 1:15
    
@gnibbler D'oh. I'm conditioned to the point of forgetting numpy.matrix exists because I habitually work with three dimensional data. Thanks for pointing that out. –  Blair Jul 3 '13 at 6:53
    
@Bitwise, A and B are matrices, sorry for not clarifying that –  Issam Laradji Jul 3 '13 at 13:33

2 Answers 2

up vote 13 down vote accepted

I might use einsum here:

>>> a = np.random.randint(0, 10, (3,3))
>>> b = np.random.randint(0, 10, (3,3))
>>> a
array([[9, 2, 8],
       [5, 4, 0],
       [8, 0, 6]])
>>> b
array([[5, 5, 0],
       [3, 5, 5],
       [9, 4, 3]])
>>> a.dot(b)
array([[123,  87,  34],
       [ 37,  45,  20],
       [ 94,  64,  18]])
>>> np.diagonal(a.dot(b))
array([123,  45,  18])
>>> np.einsum('ij,ji->i', a,b)
array([123,  45,  18])

For larger arrays, it'll be much faster than doing the multiplication directly:

>>> a = np.random.randint(0, 10, (1000,1000))
>>> b = np.random.randint(0, 10, (1000,1000))
>>> %timeit np.diagonal(a.dot(b))
1 loops, best of 3: 7.04 s per loop
>>> %timeit np.einsum('ij,ji->i', a, b)
100 loops, best of 3: 7.49 ms per loop

[Note: originally I'd done the elementwise version, ii,ii->i, instead of matrix multiplication. The same einsum tricks work.]

share|improve this answer
    
Great solution and useful benchmark! Thank you! –  Issam Laradji Jul 3 '13 at 13:19
def diag(A,B):
    diags = []
    for x in range(len(A)):
        diags.append(A[x][x] * B[x][x])
    return diags

I believe the above code is that you're looking for.

share|improve this answer
3  
That's not how matrix multiplication works –  gnibbler Jul 3 '13 at 1:19
    
Sorry. Didn't know if you meant scalar product or matrix product. –  BenjaminCohen Jul 3 '13 at 2:25

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.