See my following testing:
Method 1: This works:
sage: import sage.interfaces.gap
sage: sage.interfaces.gap.gap_cmd = "~/.local/bin/gap"
sage: gap.console()
Method 2: This fails:
sage: import sage.interfaces.gap as gap
sage: gap.gap_cmd="~/.local/bin/gap"
sage: gap.console()
On Wednesday, April 5, 2023 at 2:49:39 AM UTC+8 John H Palmieri wrote:
In lengthy code, you could start with a line like
OnSets = libgap.OnSets
and then in the rest of the code, you could do `g.Stabilizer([1,2],
OnSets)`. That is, predefine whatever you want from libgap, giving each
item a m
In lengthy code, you could start with a line like
OnSets = libgap.OnSets
and then in the rest of the code, you could do `g.Stabilizer([1,2],
OnSets)`. That is, predefine whatever you want from libgap, giving each
item a meaningful name, and then use that name in the rest of the code.
On Tuesda
Indeed, 1e-30 is too precise. Changing to 1e-10 makes it work.
The solution at https://github.com/sagemath/sage/pull/35414 is more robust.
Le samedi 1 avril 2023 à 21:21:05 UTC+2, William Stein a écrit :
> Thanks Vincent! What version of Sage are you using? With sage-9.8 I get:
>
> ---
>
> from
On Friday, March 31, 2023 at 1:38:47 AM UTC+8 Dima Pasechnik wrote:
On Thu, 30 Mar 2023, 18:25 'Peter Mueller' via sage-support, <
sage-s...@googlegroups.com> wrote:
When working with finite permutation groups, it seems to me that one has
the choice to either use the groups as sage objects l
Thank you all for your help!
I got the same error as William, but it pointed me into the right
direction. I found a way how to get the unique bounding interval of the
root in sympy and convert this interval to a sage interval. It is not the
prettiest solution but the following works for me:
fr
Indeed. Sorry. One needs to take a larger error
sage_approx = RIF(exp.n()) + RIF(-1e-10, 1e-10)
Not the best way to proceed. The solution at
https://github.com/sagemath/sage/pull/35414 should be be more robust.
Le samedi 1 avril 2023 à 21:21:05 UTC+2, William Stein a écrit :
> Thanks Vincent! W
Indeed, one has to increase the error to make it work
sage_approx = RIF(exp.n()) + RIF(-1e-10, 1e-10)
This is not the smartest way to proceed.
Le samedi 1 avril 2023 à 21:21:05 UTC+2, William Stein a écrit :
> Thanks Vincent! What version of Sage are you using? With sage-9.8 I get:
>
> ---
>
> f
