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Representative in Quotient Ring

asked 2020-01-31 06:52:13 +0100

RaymondChou gravatar image

Hello everyone!

So I'm using Sage to reduce a bunch of monomials modulo an ideal $I$ in a ring $R = \mathbb{C}[x_1,x_2,...,x_n]$. Sage, however, decides that it should reduce things and use the high index terms as a basis, instead of the lower-index terms. For example, if $I = < x_1 + x_2 + x_3 >$ for $n = 3$, Sage will reduce $x_1$ into $-x_2 - x_3$, and use $x_2$ and $x_3$ as generators, whereas I want it to use $x_1$ and $x_2$ as generators instead, and have it say $x_3 = -x_1 - x_2$. Is there a way to do this?

Thank you!

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answered 2020-01-31 10:07:21 +0100

RaymondChou gravatar image

Sorry for the dumb question; I just changed the monomial ordering in the ring and it fixed my problem!

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Asked: 2020-01-31 06:52:13 +0100

Seen: 259 times

Last updated: Jan 31 '20