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gema
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Post subject: question-multiplicative subsets Posted: Thu Oct 23, 2008 11:37 am |
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Joined: Thu Oct 23, 2008 11:16 am Posts: 2
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Hello everybody,
I would like to know if given a zero dimensional ideal J in Q[x1,...,xn] and a multiplicative subset S of Q[x1,...,xn] , it is possible to define in SINGULAR S-1(Q[x1,...,xn]/J).
And given g in Q[x1,...,xn] , is it possible to define in SINGULAR the saturation of J with respect to g?
thanks in advance for your help, best wishes, gema m.
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greuel
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Post subject: Posted: Sat Nov 15, 2008 2:57 am |
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Joined: Mon Aug 29, 2005 9:22 am Posts: 41 Location: Kaiserslautern, Germany
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Hi, You can localize in the maximal ideal <x1,...,xn> just by defining a local ring (local ordering, ends with an s = referring to series) eg. ring r = 0,x(1..n),ds; Localization in any other maximal ideal <x1-p1,...,xn-pn> is possible by translation of p to 0 (apply the translation to your ideal) and then as above. Localizations w.r.t. arbitrary mlutiplicative sets are not possible.
If you wish to analyse a 0-dim ideal you should try a primary decomposition first.
sat(J,g); does the saturation.
Here is an example:
ring r = 0,(x,y,z),dp; poly g = x3+y5+z2 +xyz; ideal J = jacob(g); LIB"primdec.lib"; primdecGTZ(J); /* [1]: [1]: _[1]=z2 _[2]=y3z _[3]=30y4+y2z _[4]=-y2z+6xz _[5]=xy+2z _[6]=3x2+yz [2]: _[1]=z _[2]=y _[3]=x [2]: [1]: _[1]=z+3888000 _[2]=y-360 _[3]=x-21600 [2]: _[1]=z+3888000 _[2]=y-360 _[3]=x-21600 */ sat(J,g); /* [1]: _[1]=z+3888000 _[2]=y-360 _[3]=x-21600 [2]: 1 */
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gema
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Post subject: thanks -multiplicative subsets Posted: Sat Nov 15, 2008 11:22 am |
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Joined: Thu Oct 23, 2008 11:16 am Posts: 2
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thanks a lot for your answer,
kind regards, gema m.
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