Hot answers tagged dot-product
You can try and see if np.einsum works better than dot for your case: cov = np.einsum('ij,kj->ik', A, A) / n The internal workings of dot are a little obscure, as it tries to use BLAS optimized routines, which sometimes require copies of arrays to be in Fortran order, not sure if that's the case here. einsum will buffer its inputs, and use vectorized ...
Python compiled with intel's mkl will run this with 12GB of memory in about 30 seconds: >>> A = np.random.rand(50000,265).astype(np.float32) >>> A.dot(A.T) array([[ 86.54410553, 64.25226593, 67.24698639, ..., 68.5118103 , 64.57299805, 66.69223785], ..., [ 66.69223785, 62.01016235, 67.35866547, ..., ...
From the documentation, dot(A,B) is the same as A'*B. so, if you try: a = [2.0000 + 0.0000i -1.0000 + 1.7321i] b = [2.0000 + 0.0000i -1.0000 - 1.7321i] dot(conj(a),b) You'll get: >> dot(conj(a),b) ans = 8.0002
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