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| Topic review - how to check that an ideal is a monomial ideal? |
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Re: how to check that an ideal is a monomial ideal? |
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Thanks, it works!  Thanks, it works! :D
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Posted: Tue Jan 19, 2010 7:30 pm |
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Re: how to check that an ideal is a monomial ideal? |
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If an ideal I is generated by monomials then these monomials are a GB of I with respect to any monomial ordering. Since the reduced GB of an ideal is unique (only depending on the ordering), I is a monomial ideal iff the reduced GB of I w.r.t. any monomial ordering consists of monomials.
If an ideal I is generated by monomials then these monomials are a GB of I with respect to any monomial ordering. Since the reduced GB of an ideal is unique (only depending on the ordering), I is a monomial ideal iff the reduced GB of I w.r.t. any monomial ordering consists of monomials.
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Posted: Tue Jan 19, 2010 3:18 pm |
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how to check that an ideal is a monomial ideal? |
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Dear Users,
is there a way to check in Singular that an ideal in a polynomial ring (say in two variables) has a monomial basis?
Maybe even to see this basis explicitly?
(My knowledge of Groebner bases is infinitesimal, sorry if the question is stupid.)
Dear Users,
is there a way to check in Singular that an ideal in a polynomial ring (say in two variables) has a monomial basis?
Maybe even to see this basis explicitly?
(My knowledge of Groebner bases is infinitesimal, sorry if the question is stupid.)
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Posted: Tue Jan 19, 2010 10:34 am |
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