Post new topic Reply to topic  [ 2 posts ] 
Author Message
 Post subject: linear algebra
PostPosted: Thu Aug 11, 2005 5:31 pm 
'tDear Singular users,

'tIs it possible to solve linear systems with
singular ? To be more precise, if A is a given nxm
matrix (of number) and B another given nxk matrix
(of number), is it possible to compute X such that
AX=B ?
'tAlso, what is the more efficient way to compute
the kernel of a matrix of number ? syz(A) ?

Best regards,
Laurent Buse.


email: lbuse@unice.fr
Posted in old Singular Forum on: 2002-08-06 15:31:42+02


Report this post
Top
  
Reply with quote  
 Post subject:
PostPosted: Thu Sep 22, 2005 7:43 pm 

Joined: Wed Sep 21, 2005 1:27 pm
Posts: 10
Location: Kaiserslautern, Germany
Dear Laurent,

of course, it is possible to solve systems of linear
equations with SINGULAR. Assume A=(a_{ij}) is a matrix and b
a vector, both with entries in a field F (or, if you
like, of type number). Then you may solve the system
Ax=b in the following manner:

- create the ideal

I = < sum_j (a_{1j}*x_j-b_1) , ... , sum_j (a_{rj}*x_j-b_r) >

and compute a reduced standard basis G of I with respect
to a global monomial ordering (e.g. dp).

- the system Ax=b is solvable over F if and only if
G is not {1}, and then the solutions can be read from G.

You can also solve systems with parameters (i.e., for
different right-hand sides at a time):

Example: Solve the system of linear equations in
x,y,z,u,

3x + y + z - u = a
13x + 8y + 6z - 7u = b
14x +10y + 6z - 7u = c
7x + 4y + 3z - 3u = d

with parameters a,b,c,d. In SINGULAR:

ring R = (0,a,b,c,d),(x,y,z,u),(c,dp);
ideal E = 3x + y + z - u - a,
13x + 8y + 6z - 7u - b,
14x + 10y + 6z - 7u - c,
7x + 4y + 3z - 3u - d;
option(redSB);
simplify(std(E),1); //compute reduced SB

//-> _[1]=u+(6/5a+4/5b+1/5c-12/5d)
//-> _[2]=z+(16/5a-1/5b+6/5c-17/5d)
//-> _[3]=y+(3/5a+2/5b-2/5c-1/5d)
//-> _[4]=x+(-6/5a+1/5b-1/5c+2/5d)

Hence, the (unique) solution is:
x = 1/5 * (6a-b+c-2d),
y = 1/5 * (-3a-2b+2c+d),
z = 1/5 * (-16a+b-6c+17d),
u = 1/5 * (-6a-4b-c+12d).

This and more information about solving you can find in
the new Springer textbook "A SINGULAR Introduction to
Commutative Algebra" (by G.-M. Greuel and G. Pfister).

Concerning your second question: in SINGULAR 'syz(A)' is
the most efficient way to compute the kernel of A.

Best regards, Christoph Lossen.

email: lossen@mathematik.uni-kl.de
Posted in old Singular Forum on: 2002-08-16 13:04:51+02


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 11:00 am
Powered by phpBB © 2000, 2002, 2005, 2007 phpBB Group