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I have two numpy arrays, one of size (386, 3, 4) and another of size (386, 4), which I will call values and keys respectively. The second array contains integers which are indices to my output array. I need to implement the following for loop -

for i in range(386):
    for j in range(4):
        output[keys[i, j]] += values[i, :, j]

Of course, output has dimensions (max_index + 1, 3). Could I make way with a vectorized implementation?

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  • Soooo output is a dictionary, or not? Why the scare quotes? Mar 21 '17 at 21:22
  • output is another numpy array Mar 21 '17 at 21:23
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I think np.add.at should do what you want:

np.add.at(output, keys, np.transpose(values, (0, 2, 1)))

Small array example:

values
# array([[[100, 200, 300, 400],
    [ 10,  20,  30,  40],
    [  1,   2,   3,   4]],

   [[500, 600, 700, 800],
    [ 50,  60,  70,  80],
    [  5,   6,   7,   8]]])
keys
# array([[4, 0, 3, 1],
   [1, 0, 2, 2]])
out
# array([[0, 0, 0],
   [0, 0, 0],
   [0, 0, 0],
   [0, 0, 0],
   [0, 0, 0]])
np.add.at(out, keys, np.transpose(values, (0, 2, 1)))
out
# array([[ 800,   80,    8],
   [ 900,   90,    9],
   [1500,  150,   15],
   [ 300,   30,    3],
   [ 100,   10,    1]])
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Approach #1

Here's one approach using np.tensordot -

# Store size param         
n = values.shape[0]

# Get mask for mapping each key to corresponding row in o/p array
# Simply put : mask = keys==np.arange(n)[:,None,None]        
r,c = np.indices(keys.shape)
mask = np.zeros((keys.max()+1,n,keys.shape[1]),dtype=bool)
mask[keys,r,c] = 1

# Finally mask and sum reduce elems off values
out = np.tensordot(mask, values, axes=((1,2),(0,2)))

Approach #2

Here's another with np.add.reduceat after sorting the columns based on the keys -

n,nr = values.shape[:2]        
kr = keys.ravel()
sidx = kr.argsort()
krs = kr[sidx]
v = values.transpose(1,0,2).reshape(nr,-1)[:,sidx]

cut_idx = np.r_[0,np.flatnonzero(krs[1:] != krs[:-1])+1]
out = np.zeros((keys.max()+1,nr))
out[krs[cut_idx]] = np.add.reduceat(v, cut_idx, axis=1).T
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  • Thank you, but @PaulPanzer's approach seems to be a lot easier Mar 22 '17 at 4:16

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