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Re: eigenvectors
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From: |
Daniel Heiserer |
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Subject: |
Re: eigenvectors |
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Date: |
Mon, 14 Jun 1999 10:50:47 +0200 |
address@hidden wrote:
>
> address@hidden wrote:
> >
> > This may be a dumb question, forgive me, it's been too long.
> >
> > I have a real, square matrix Q and I need to factorize it as
> >
> > Q = inv(X)*D*X
> >
> > where D is diagonal. I think that this means that D contains the
> > eigenvalues and X contains the eigenvectors of Q. Is that right? How do
> > I get D and X from octave. The function svd gives the "right and left"
> > eigenvectors for any matrix. I thought that for square matrices this
> > would mean that it would return X but I was wrong.
> >
> > Sheepishly,
> > Heber
> >
> >
>
> Well, the problem is that not every matrix can be factorized in that
> way. In general, what one has is the _Jordan_ form. Furthermore, the
> singular value decomposition (svd) is not directly related to your
> problem. The situation is difficult to explain in just few lines, you
> may want to consult a linear algebra textbook on the matter.
>
Yeah. Is there a [J,X]=jordan(X) function in octave, or can somebody
contribute one?
Bye daniel
--
Mit freundlichen Gruessen
Daniel Heiserer
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Dipl.-Phys. Daniel Heiserer, BMW AG, Knorrstrasse 147, 80788 Muenchen
Abteilung EK-20
Tel.: 089-382-21187, Fax.: 089-382-42820
mailto:address@hidden
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