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Topic review - Basis of Quotient Ring |
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Re: Basis of Quotient Ring |
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Quote: > Let S be the polynomial ring of n- variables, J be a homogenous ideal generated by homogenous elements f_1,..,f_m.
>Consider the quotient ring S/J of S modulo J. Can one find a basis of the graded piece of (S/J)_i of given degree i by exploiting commands of SINGULAR? If so, what are the appropriate SINGULAR commands? There are two commands you can use: kbase and jet. We recommend to use kbase with the second argument, for example Code: ring r=32003,(x,y,z),ds; ideal i=x2,y3,xyz; kbase(std(i),2); ==> _[1]=z2 ==> _[2]=yz ==> _[3]=xz ==> _[4]=y2 ==> _[5]=xy More information you can find in the documentation. kbase: http://www.singular.uni-kl.de/Manual/3-0-0/sing_218.htmjet: http://www.singular.uni-kl.de/Manual/3-0-0/sing_217.htmHave fun,
[quote]> Let S be the polynomial ring of n- variables, J be a homogenous ideal generated by homogenous elements f_1,..,f_m.
>Consider the quotient ring S/J of S modulo J. Can one find a basis of the graded piece of (S/J)_i of given degree i by exploiting commands of SINGULAR? If so, what are the appropriate SINGULAR commands?[/quote]
There are two commands you can use: kbase and jet. We recommend to use kbase with the second argument, for example [code]ring r=32003,(x,y,z),ds; ideal i=x2,y3,xyz; kbase(std(i),2); ==> _[1]=z2 ==> _[2]=yz ==> _[3]=xz ==> _[4]=y2 ==> _[5]=xy[/code]
More information you can find in the documentation.
kbase: http://www.singular.uni-kl.de/Manual/3-0-0/sing_218.htm
jet: http://www.singular.uni-kl.de/Manual/3-0-0/sing_217.htm
Have fun,
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Posted: Thu Aug 11, 2005 8:51 pm |
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Basis of Quotient Ring |
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Let S be the polynomial ring of n- variables, J be a homogenous ideal generated by homogenous elements f_1,..,f_m. Consider the quotient ring S/J of S modulo J. Can one find a basis of the graded piece of (S/J)_i of given degree i by exploiting commands of SINGULAR? If so, what are the appropriate SINGULAR commands? email: msheng@math.cuhk.edu.hkPosted in old Singular Forum on: 2004-01-05 13:14:24+01
Let S be the polynomial ring of n- variables, J be a homogenous ideal generated by homogenous elements f_1,..,f_m. Consider the quotient ring S/J of S modulo J. Can one find a basis of the graded piece of (S/J)_i of given degree i by exploiting commands of SINGULAR? If so, what are the appropriate SINGULAR commands?
email: msheng@math.cuhk.edu.hk Posted in old Singular Forum on: 2004-01-05 13:14:24+01
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Posted: Thu Aug 11, 2005 5:32 pm |
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