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I'm using numpy.svd to compute singular value decompositions of badly conditioned matrices. For some special cases the svd won't converge and raise a Linalg.Error. I've done some research and found that numpy uses the DGESDD routine from LAPACK. The standard implementation has a hardcoded iteration limit of 35 or something iterations. If I try to decompose the same matrix in Matlab, everything works fine, and I think there's two reasons for that: 1. Matlab uses DGESVD instead of DGESDD which in general seems to be more robust. 2. Matlab uses an iteration limit of 75 in the routine. (They changed it in the source and recompiled it.)

Now the question is: Is there a simple way to change the used backend in numpy from DGESDD to DGESVD without having to modify the numpy source ?

Thanks in advance Mischa

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  • This is quite unlikely, but you could write your own f2py module calling DGESVD. May 21, 2012 at 10:27
  • I was hoping to avoid that, but it seems I will have to do it anyway...
    – schtopps
    May 21, 2012 at 10:48

2 Answers 2

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What worked for me was to only compute the "economy size" SVD of that matrix X:

U,S,V = np.linalg.svd(X, full_matrices=False)
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I'm a little late, but maybe this will help someone else...

I had a similar problem in julia.

I found this approach from the R help list, which should work for any environment using the lapack library:

Basically, if svd(M) fails, try svd(M'), and swap the resulting U,V appropriately.

Here's how I'm doing it in julia:

try
  U,S,V = svd( E_restricted )
  failed = false
catch
  failed = true
end
if failed
  # try it with matrix transposed
  try
    V,S,U = svd( E_restricted' )
    failed = false
  catch
    failed = true
  end
end
if failed
  error("ERROR: svd(E) and svd(E') failed!")
end
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