|  |  D.7.1.12 evaluate_reynolds Procedure from libraryfinvar.lib(see  finvar_lib).
 
Example:Usage:
evaluate_reynolds(REY,I);
REY: a <matrix> representing the Reynolds operator, I: an arbitrary
<ideal>
 
Assume:
REY is the first return value of group_reynolds() or reynolds_molien()
Returns:
image of the polynomials defining I under the Reynolds operator
(type <ideal>)
Note:
the characteristic of the coefficient field of the polynomial ring
should not divide the order of the finite matrix group
Theory:
REY has been constructed in such a way that each row serves as a ring
mapping of which the Reynolds operator is made up.
 |  | LIB "finvar.lib";
ring R=0,(x,y,z),dp;
matrix A[3][3]=0,1,0,-1,0,0,0,0,-1;
list L=group_reynolds(A);
ideal I=x2,y2,z2;
print(evaluate_reynolds(L[1],I));
==> 1/2x2+1/2y2,
==> 1/2x2+1/2y2,
==> z2
 | 
 
 |