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| Topic review - HELP: Matrix A can be diagnolized, and the basis of eigenve |
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Re: HELP: Matrix A can be diagnolized, and the basis of eigenve |
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If I understand the question correct, the following should work:
Load the libraries absfact.lib and linalg.lib,
compute the charcteristic polynomial p with e.g. charpoly,
Use the command to absFactorize to find the splitting field of p,
create a ring over the splitting field and map your matrix to this ring,
then use linear algebra from linalg.lib, e.g. jordanmatrix.
Hope this helps
If I understand the question correct, the following should work:
Load the libraries absfact.lib and linalg.lib,
compute the charcteristic polynomial p with e.g. charpoly,
Use the command to absFactorize to find the splitting field of p,
create a ring over the splitting field and map your matrix to this ring,
then use linear algebra from linalg.lib, e.g. jordanmatrix.
Hope this helps
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Posted: Thu Jan 07, 2010 6:01 pm |
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HELP: Matrix A can be diagnolized, and the basis of eigenve |
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I have the following problem: Given a matrix A defined ring r = 0, (x, y, z), dp; that has its VAPs in an extension of the base of coefientes. How can I get the diagonalization of A? And this matrix diagonal and the basis of eigenvectors?
I have the following problem: Given a matrix A defined ring r = 0, (x, y, z), dp; that has its VAPs in an extension of the base of coefientes. How can I get the diagonalization of A? And this matrix diagonal and the basis of eigenvectors?
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Posted: Thu Nov 05, 2009 6:06 pm |
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