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D.6.7.4 lift_rel_kb
Procedure from librarydeform.lib (see deform_lib).
- Usage:
- lift_rel_kb(N,M[,kbaseM,p]);
- Assume:
- [p a monomial ] or the product of all variables
N, M modules of same rank, M depending only on variables not in p and vdim(M) is finite in this ring,
[ kbaseM the kbase of M in the subring given by variables not in p ]
warning: these assumptions are not checked by the procedure - Return:
- matrix A, whose j-th columns present the coeff's of N[j] in kbaseM,
i.e. kbaseM*A = reduce(N,std(M))
LIB "deform.lib"; ring r=0,(A,B,x,y),dp; module M = [x2,xy],[xy,y3],[y2],[0,x]; module kbaseM = [1],[x],[xy],[y],[0,1],[0,y],[0,y2]; poly f=xy; module N = [AB,BBy],[A3xy+x4,AB*(1+y2)]; matrix A = lift_rel_kb(N,M,kbaseM,f); print(A); ==> AB,0, ==> 0, 0, ==> 0, A3, ==> 0, 0, ==> 0, AB, ==> B2,0, ==> 0, AB "TEST:"; ==> TEST: print(matrix(kbaseM)*A-matrix(reduce(N,std(M)))); ==> 0,0, ==> 0,0 |