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D.7.1.18 primary_charp_no_molien
Procedure from libraryfinvar.lib (see finvar_lib).
- Usage:
- primary_charp_no_molien(REY[,v]);
REY: a <matrix> representing the Reynolds operator, v: an optional <int> - Assume:
- REY is the first return value of group_reynolds or reynolds_molien
- Display:
- information about the various stages of the programme if v does not
equal 0
- Return:
- primary invariants (type <matrix>) of the invariant ring and an
<intvec> listing some of the degrees where no non-trivial homogeneous
invariants are to be found
- Theory:
- Bases of homogeneous invariants are generated successively and those
are chosen as primary invariants that lower the dimension of the ideal
generated by the previously found invariants (see paper "Generating a
Noetherian Normalization of the Invariant Ring of a Finite Group" by
Decker, Heydtmann, Schreyer (1998)).
LIB "finvar.lib"; ring R=3,(x,y,z),dp; matrix A[3][3]=0,1,0,-1,0,0,0,0,-1; list L=group_reynolds(A); list l=primary_charp_no_molien(L[1]); print(l[1]); ==> z2,x2+y2,x2y2 |