dot function¶
(Shortest import: from brian2 import dot)
- brian2.units.unitsafefunctions.dot(a, b, out=None)¶
Dot product of two arrays. Specifically,
If both
aandbare 1-D arrays, it is inner product of vectors (without complex conjugation).If both
aandbare 2-D arrays, it is matrix multiplication, but usingmatmul()ora @ bis preferred.If either
aorbis 0-D (scalar), it is equivalent tomultiply()and usingnumpy.multiply(a, b)ora * bis preferred.If
ais an N-D array andbis a 1-D array, it is a sum product over the last axis ofaandb.If
ais an N-D array andbis an M-D array (whereM>=2), it is a sum product over the last axis ofaand the second-to-last axis ofb:dot(a, b)[i,j,k,m] = sum(a[i,j,:] * b[k,:,m])
It uses an optimized BLAS library when possible (see
numpy.linalg).- Parameters:
a : array_like
First argument.
b : array_like
Second argument.
out : ndarray, optional
Output argument. This must have the exact kind that would be returned if it was not used. In particular, it must have the right type, must be C-contiguous, and its dtype must be the dtype that would be returned for
dot(a,b). This is a performance feature. Therefore, if these conditions are not met, an exception is raised, instead of attempting to be flexible.- Returns:
output : ndarray
Returns the dot product of
aandb. Ifaandbare both scalars or both 1-D arrays then a scalar is returned; otherwise an array is returned. Ifoutis given, then it is returned.
Raises
ValueErrorIf the last dimension of
ais not the same size as the second-to-last dimension ofb.
See also
Examples
>>> import numpy as np >>> np.dot(3, 4) 12
Neither argument is complex-conjugated:
>>> np.dot([2j, 3j], [2j, 3j]) (-13+0j)
For 2-D arrays it is the matrix product:
>>> a = [[1, 0], [0, 1]] >>> b = [[4, 1], [2, 2]] >>> np.dot(a, b) array([[4, 1], [2, 2]])
>>> a = np.arange(3*4*5*6).reshape((3,4,5,6)) >>> b = np.arange(3*4*5*6)[::-1].reshape((5,4,6,3)) >>> np.dot(a, b)[2,3,2,1,2,2] 499128 >>> sum(a[2,3,2,:] * b[1,2,:,2]) 499128
