Post new topic Reply to topic  [ 2 posts ] 
Author Message
 Post subject: Smith normal form of Laurent Polynomial matrices
PostPosted: Wed Jun 03, 2015 1:35 am 
Hi,

I need help to diagonalize a matrix with entries Laurent polynomial. Hence, I work with matrices in the PID Q[t,t^{-1}]. Does anybody know how can I do?
Because I found documentation about the diagonalization of matrices but not on the Laurent polynomial ring, which I don't know how to declare on Singular!

Thank you very much for your help,

Yoann


Report this post
Top
  
Reply with quote  
 Post subject: Re: Smith normal form of Laurent Polynomial matrices
PostPosted: Thu Oct 01, 2015 4:17 pm 

Joined: Thu Aug 11, 2005 8:03 pm
Posts: 40
Location: RWTH Aachen, Germany
Hi Yoann,

it is in principle possible but there's no ready-to-use solution (as far as
I can see). The technology is described in two papers:

Viktor Levandovskyy and Kristina Schindelar : Fraction-free algorithm for the computation of diagonal forms matrices over Ore domains using Gröbner bases . Journal of Symbolic Computation 47,10 (2012), 1214-1232
http://dx.doi.org/10.1016/j.jsc.2011.12.042

Viktor Levandovskyy and Kristina Schindelar : Computing diagonal form and Jacobson normal form of a matrix using Gröbner bases . Journal of Symbolic Computation 46,5 (2011), 595-608
http://dx.doi.org/10.1016/j.jsc.2010.10.009

and implemented in jacobson_lib (see D.11 System and Control theory
in the Manual). Actually the procedure smith from jacobson_lib
has a built-in restriction that the basering should contain only one
variable. However, this is not crucial for the Laurent situation, since
the latter is a PID. One has to look at the code; it makes an interesting
research+implementation project (do you wish to embark
on that?). Feel free to contact me.
Cheers,
Viktor Levandovskyy


Report this post
Top
 Profile  
Reply with quote  
Display posts from previous:  Sort by  
Post new topic Reply to topic  [ 2 posts ] 

You can post new topics in this forum
You can reply to topics in this forum
You cannot edit your posts in this forum
You cannot delete your posts in this forum
You cannot post attachments in this forum

It is currently Fri May 13, 2022 11:02 am
Powered by phpBB © 2000, 2002, 2005, 2007 phpBB Group