Dismiss
Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

# How do I compute a Groebner Base of a system of equations in Matlab

I am trying to verify that a system of equations has a non empty set of solutions in Matlab. I know that this can be done by computing the Groebner base, and if that is equal to one then the system has an empty solution set. Can I do this in Matlab and how?

-

You have to build a vector with the set of polynomials. This must be a string of the form

f1 , f2, ..., fn

where f1, f2, ..., fn are the polynomias , e.g. f1=x^2-1, f2=y*x^3-x-2 . This MUST be a string. You can construct it from an cell array of polynomials e.g. polyCell={f1, f2, ..., fn} with

polyRing = strcat(polyCell{:});
polyRing(end)=[];

Then you should make a call to the appropriate function in Mupad with

groebnerBasis=evalin(symengine,['groebner::gbasis([' polyRing '])']);

or to evaluate with lexicographic order :

groebnerBasis=evalin(symengine,['groebner::gbasis([' polyRing '],LexOrder)']);

That's it. You may want to use Mupad directly, as well, but I'll let you check the documentation.

-
This is executed in mupad? but I don't have it installed. – user1276982 Mar 18 '12 at 14:40
Mupad is the default symbolic engine in Matlab, it is installed with Matlab. – user677656 Mar 18 '12 at 14:41