This post was prepared to be upload to ask.sagemath.org, but I got a
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that forbids me to post the question.
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I'm interested in solving the differential equation $$3 h' + 3 h^2 = c_1,$$
where
Hello,
I maintain a JupyterHub service for my department (currently Julia and
Python), and a professor has asked us to support Sage. I've played around
with it, but without much luck; the issue seems to be that Sage's Python
interferes with the main JupyterHub. I can't find a quick fix.
this is also not working in 8.8.beta4:
Does one need beta5? Or some ticket which is not yet in?
On Mon, May 13, 2019 at 3:30 PM Santanu Sarkar
wrote:
>
> Hi,
> Sorry. This is not working:
>
> K. = FunctionField(GF(2))
> R. = K[]
> f=y^2 + 1 + 1/x
> L. = K.extension(f)
> print L.places(1)
>
>
Hi,
Sorry. This is not working:
K. = FunctionField(GF(2))
R. = K[]
f=y^2 + 1 + 1/x
L. = K.extension(f)
print L.places(1)
I am using https://sagecell.sagemath.org/
On Mon, 13 May 2019 at 16:48, Vincent Delecroix <20100.delecr...@gmail.com>
wrote:
> Hello,
>
> It works for me and I obtain
>
>
Hello,
It works for me and I obtain
[Place (1/x, y), Place (1/x, y + 1), Place (x, x*y)]
Could you describe the SageMath version you are using?
Vincent
Le 13/05/2019 à 10:10, Santanu Sarkar a écrit :
Hi,
This code works well.
K. = FunctionField(GF(2))
R. = K[]
f=y^2 + y + 1/x
L. =
Hi,
This code works well.
K. = FunctionField(GF(2))
R. = K[]
f=y^2 + y + 1/x
L. = K.extension(f)
print L.places(1)
But if I take f=y^2 + y + 1/x, it is giving error.
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