I have a polynomial ring $R=k[x,y,z...]$ and a given ideal $I$ (defined by given generators) and several polynomials $f_1,f_2,...$ in the ring. I also have several other elements of $R$ given as polynomials in $f_1,f_2,...$ and $x,y,z...$. I wish to determine whether these elements lie in the ideal or not. I do not have exact expressions for $f_1,f_2,...$ but I know certain relations that hold between these and the indeterminates. Now, my problem is computational. I wish to simplify the expressions I have to a more manageable form where I am able to "see" the membership. So I was wondering whether there are any softwares that will allow me to automate this. Essentially I would like to feed the relations to the software, and it should simplify the expression as much as possible using these relations. So far I have tried Maple and Matlab, but both of those require too much manual intervention. For example the expression I have may have a term like $f_1(x+f_1)$ and I have a relation $f_1^2=f_2+f_3$. Then I would like the term simplified to $xf_1+f_2+f_3$. Is there any software that might help me with this?
Simplifying expressions
2
$\begingroup$
abstract-algebra
ring-theory
ideals
computer-algebra-systems