# numpy dot product of ith row with ith column

In numpy:

A = np.array([[1,2,3],[4,5,6]])
array([[1, 3, 5],
[2, 4, 6]])

B = np.array([[1,2],[3,4],[5,6]])
array([[1, 2],
[3, 4],
[5, 6]])

A.dot(B)
array([[35, 44],
[44, 56]])


I only care about getting A.dot(B).diagonal() = array([35, 56])

Is there a way I can get array([35, 56]) without having to compute the inner products of all the rows and columns? i.e. inner product of the ith row with ith column. I ask because performance difference becomes more significant for larger matrices...

thanks

-

This is just matrix multiplication for 2D arrays:

C[i, j] = sum(A[i, ] * B[, j])


So since you just want the diagonal elements, looks like you're after

sum(A[i, ] * B[, i]) # for each i


So you could just use list comprehension:

[np.dot(A[i,:], B[:, i]) for i in xrange(A.shape[0])]
# [22, 64]


OR, (and this only works because you want a diagonal so this assumes that if A's dimensions are n x m, B's dimensions will be m x n):

np.sum(A * B.T, axis=1)
# array([22, 64])


(no fancy numpy tricks going on here, just playing around with the maths).

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thanks again... so it's not as elegant as stackoverflow.com/questions/2301046/… :( –  ejang Nov 20 '12 at 1:05
Well if you found that question you can translate it directly into numpy (I thought of the exact same thing as soon as I posted the answer and added it to my answer) –  mathematical.coffee Nov 20 '12 at 1:07