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shox
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Post subject: How to define a ring of differential operator Posted: Mon Jul 06, 2015 9:56 pm |
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Hello,
i want to define and eventually construct a groebner basis for an Ideal in a Ring of differnetial operators, for example K[x1,.......xn][D1,.........,Dn] which should somehow be possible with nc_algebra (since the Ring is a g-algebra).
Since i can only give singular information about variables i would can define how the xi and Dj interact with each other, but to compute a groebner basis, singular has to handle any element of K[x1,....,xn] as a coefficient . But x1x2 has to have the same degree as for example x1.
I do not see a possibility how Singular will allow me to define the noncommutative properties of the ring and also handle any element out of K[x1,...,xn] the way it needs to (for example giving me x1+x2 as leading coefficient of (x1+x2)D1).
Is there any possibility to solve my problem?
best regards,
kolja.
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hannes
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Post subject: Re: How to define a ring of differential operator Posted: Thu Jul 09, 2015 10:22 am |
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Joined: Wed May 25, 2005 4:16 pm Posts: 275
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Use a block ordering (as ordering for the variables x_i, Dx_i) which allows to consider the variables of the first Block as the main variables and the variables of the second block as "coeffcients". See Gianni, P.; Trager, B.;Zacharias, G.: Gröbner bases and Primary Decomposition of Polynomial Ideals. Journal of Symbolic Computation. 1985. for details, here this trick is used to compute Groebner basesin K[x_i][y_i] but it works also in the non-commutative case.
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Guest
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Post subject: Re: How to define a ring of differential operator Posted: Thu Jul 09, 2015 5:52 pm |
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Thank you very much, i will try that
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levandov
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Post subject: Re: How to define a ring of differential operator Posted: Wed Sep 30, 2015 4:28 pm |
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Joined: Thu Aug 11, 2005 8:03 pm Posts: 40 Location: RWTH Aachen, Germany
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