CoCoA:Interreduce, Interreduced
Interreduce, Interreduced
interreduce a list of polynomials or vectors
Description
These functions reduce each polynomial (resp., vector) using the other
polynomials (resp., vectors) as reduction rules. The process
terminates when each is in normal form with respect to the others. The function Interreduce takes a variable containing a list and overwrites that variable with the interreduced list. The second returns an interreduced list without affecting its arguments.
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 (resp., vector) is in normal form when its leading term with respect to the current term ordering cannot be reduced. If FullRed is TRUE it means that a polynomial (resp., vector) is in normal form if and only if each monomial cannot be reduced.
Example
UnSet FullRed; -- FullRed = FALSE Use R ::= Q[x,y,z]; Interreduced([x^3-xy^2+yz,xy,z]); [x^3 - xy^2 + yz, xy, z] ------------------------------- Set FullRed; -- FullRed = TRUE (the default value) Interreduced([x^3-xy^2+yz,xy,z]); [xy, z, x^3] ------------------------------- L := [x^3-xy^2+yz,xy,z]; Interreduce(L); L; [xy, z, x^3] -------------------------------
Syntax
Interreduce(V:LIST of POLY):NULL Interreduce(V:LIST of VECTOR):NULL Interreduced(L:LIST of POLY):LIST of POLY Interreduced(L:LIST of VECTOR):LIST of VECTOR where V is a variable containing a list.
<type>ideal</type> <type>module</type> <type>list</type>
