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D.8.10.5 zeroSet
Procedure from libraryzeroset.lib (see zeroset_lib).
- Usage:
- zeroSet(I [,opt] ); I=ideal, opt=integer
- Purpose:
- compute the zero-set of the zero-dim. ideal I, in a finite extension
of the ground field.
- Return:
- ring, a polynomial ring over an extension field of the ground field,
containing a list 'theZeroset', a polynomial 'newA', and an
ideal 'id':
- 'theZeroset' is the list of the zeros of the ideal I, each zero is an ideal. - if the ground field is Q(b) and the extension field is Q(a), then 'newA' is the representation of b in Q(a). If the basering contains a parameter 'a' and the minpoly remains unchanged then 'newA' = 'a'. If the basering does not contain a parameter then 'newA' = 'a' (default). - 'id' is the ideal I in Q(a)[x_1,...] (a' substituted by 'newA') - Assume:
- dim(I) = 0, and ground field to be Q or a simple extension of Q given
by a minpoly.
- Options:
- opt = 0: no primary decomposition (default)
opt > 0: primary decomposition - Note:
- If I contains an algebraic number (parameter) then I must be
transformed w.r.t. 'newA' in the new ring.
LIB "zeroset.lib"; ring R = (0,a), (x,y,z), lp; minpoly = a2 + 1; ideal I = x2 - 1/2, a*z - 1, y - 2; def T = zeroSet(I); setring T; minpoly; ==> (4a4+4a2+9) newA; ==> (1/3a3+5/6a) id; ==> id[1]=(1/3a3+5/6a)*z-1 ==> id[2]=y-2 ==> id[3]=2*x2-1 theZeroset; ==> [1]: ==> _[1]=(-1/3a3+1/6a) ==> _[2]=2 ==> _[3]=(-1/3a3-5/6a) ==> [2]: ==> _[1]=(1/3a3-1/6a) ==> _[2]=2 ==> _[3]=(-1/3a3-5/6a) map F1 = basering, theZeroset[1]; map F2 = basering, theZeroset[2]; F1(id); ==> _[1]=0 ==> _[2]=0 ==> _[3]=0 F2(id); ==> _[1]=0 ==> _[2]=0 ==> _[3]=0 |