CoCoA:NF
From ApCoCoAWiki
NF
normal form
Description
The first function returns the normal form of F with respect to I.
It also computes a Groebner basis of I if that basis has not been
computed previously.
The second function returns the normal form of V with respect to M. It
also computes a Groebner basis of M if that basis has not been
computed previously.
The coefficient ring is assumed to be a field. Note that the
definition of normal form depends on the current value of the option
FullRed of the panel GROEBNER. If FullRed is FALSE it means that a polynomial is in normal form when its leading term with respect to the the current term ordering cannot be reduced. If FullRed is TRUE it means that a polynomial is in NF if and only if each monomial cannot be reduced.
Example
Use R ::= Q[x,y,z]; Set FullRed; I := Ideal(z); NF(x^2+xy+xz+y^2+yz+z^2,I); x^2 + xy + y^2 ------------------------------- UnSet FullRed; NF(x^2+xy+xz+y^2+yz+z^2,I); x^2 + xy + y^2 + xz + yz + z^2 -------------------------------
Syntax
NF(F:POLY,I:IDEAL):POLY NF(V:VECTOR,M:MODULE):VECTOR
<type>groebner</type> <type>groebner-basic</type> <type>ideal</type> <type>module</type> <type>polynomial</type> <type>vector</type>
