Sorry for catching up so late,
The Maple package for differential algebra, mostly written by François Boulier,
has been ported to SAGE. It is not part of SAGE yet, but we hope that it will
soon be.
In any case, you can follow its progress there :
http://trac.sagemath.org/sage_trac/ticket/1326
William asked me to forward his reply...
(One remark: William always developed for Axiom. In Sage, the variant
of Axiom usually provided is FriCAS. To the best of my knowledge, all
libraries developed for Axiom is provided by FriCAS as well.)
"William Sit" writes:
> Dear Martin:
>
> I just n
Daniel Bearup writes:
> Apologies if this is the wrong place to ask this question.
>
> Does SAGE incorporate support for differential algebra? That is can it
> handle differential rings/ideals and does it have an implementation of
> the Rosenfeld-Groebner and Ritt algorithms?
I'm not sure, but
See http://en.wikipedia.org/wiki/Differential_algebra - related to D-
modules, but not the same. Kaplansky has a book about this I've
always meant to read...
Maple definitely supports this; it was unclear whether Mma does,
though apparently not directly. I could not find any reference to
this o
On Wed, Jul 29, 2009 at 7:56 AM, Daniel
Bearup wrote:
>
> Apologies if this is the wrong place to ask this question.
>
> Does SAGE incorporate support for differential algebra? That is can it
> handle differential rings/ideals and does it have an implementation of
> the Rosenfeld-Groebner and Ritt
On Jul 29, 7:56 am, Daniel Bearup
wrote:
> Apologies if this is the wrong place to ask this question.
>
> Does SAGE incorporate support for differential algebra? That is can it
> handle differential rings/ideals and does it have an implementation of
> the Rosenfeld-Groebner and Ritt algorithms?
Apologies if this is the wrong place to ask this question.
Does SAGE incorporate support for differential algebra? That is can it
handle differential rings/ideals and does it have an implementation of
the Rosenfeld-Groebner and Ritt algorithms?
Thanks,
Daniel
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