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How to compute the pseudo inverse of a vector and also the determinant? (preferably with either numpy, or better pandas)

I tried this but it doesn't work:

import numpy
vect = [1, 2, 3, 4]
numpy.linalg.pinv(vect)

But I get this error:

---------------------------------------------------------------------------
LinAlgError                               Traceback (most recent call last)
<ipython-input-106-e362654e383f> in <module>()
     19 vect = [1, 2, 3, 4]
---> 20 print(np.linalg.pinv(vect))

C:\Python27\lib\site-packages\numpy\linalg\linalg.pyc in pinv(a, rcond)
   1544     _assertNonEmpty(a)
   1545     a = a.conjugate()
-> 1546     u, s, vt = svd(a, 0)
   1547     m = u.shape[0]
   1548     n = vt.shape[1]

C:\Python27\lib\site-packages\numpy\linalg\linalg.pyc in svd(a, full_matrices, compute_uv)
   1269     """
   1270     a, wrap = _makearray(a)
-> 1271     _assertRank2(a)
   1272     _assertNonEmpty(a)
   1273     m, n = a.shape

C:\Python27\lib\site-packages\numpy\linalg\linalg.pyc in _assertRank2(*arrays)
    153         if len(a.shape) != 2:
    154             raise LinAlgError, '%d-dimensional array given. Array must be \
--> 155             two-dimensional' % len(a.shape)
    156 
    157 def _assertSquareness(*arrays):

LinAlgError: 1-dimensional array given. Array must be             two-dimensional
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1 Answer 1

up vote 3 down vote accepted

Perhaps you want this?

>>> np.linalg.pinv([[1, 2, 3, 4]])
array([[ 0.03333333],
       [ 0.06666667],
       [ 0.1       ],
       [ 0.13333333]])

Note the extra set of brackets. As the error message suggests, you can only take the pseudo-inverse of a matrix. If you just have a vector you need to make it into a 1-row matrix.

share|improve this answer
    
Thank's for the tip! Indeed it works for linalg.pinv, but it does not for linalg.det! (error: "Array must be square") Do you have any idea how I can deal with det? –  user1121352 Apr 8 '13 at 19:33
1  
@user1121352: Can I ask what use case you have for a determinant of a non-square matrix? –  DSM Apr 8 '13 at 19:38
    
@user1121352: The determinant is only mathematically defined for square matrices. –  BrenBarn Apr 8 '13 at 19:38
    
No it's okay, I was adapting a code I did in the past with Octave, and the Octave's diag() function both can return a vector from a matrix, or a matrix from a vector (highly confusing!). Thank's for the tip, I keep it in my books. –  user1121352 Apr 8 '13 at 19:41
1  
@BrenBarn: there are actually some generalizations you can make and still call something a determinant, but they're pretty obscure, and seldom useful. (BTW, your avatar takes me way back..) –  DSM Apr 8 '13 at 19:44

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