On Nov 5, 8:12 pm, Felix Lawrence wrote:
> I've now built 4.6.1alpha0, and this is what I get:
>
> sage: import scipy.fftpack as Fourier
> sage: Fourier.ifft([95,20-25*i,-23,20+25*i])
> ...
> ValueError: setting an array element with a sequence.
>
> sage: Fourier.ifft([95,20,-23,20])
> array([ 2
On 11/03/2010 09:32 PM, Jason Grout wrote:
> On 11/3/10 3:30 PM, David Joyner wrote:
>> Sage seems to be reporting eigenvalues incorrectly. Can this bug been
>> reported before?
>
> It's well known that serious numerical issues come up when doing
> eigenvalues of CC or RR matrices. That's why the
I've now built 4.6.1alpha0, and this is what I get:
sage: import scipy.fftpack as Fourier
sage: Fourier.ifft([95,20-25*i,-23,20+25*i])
...
ValueError: setting an array element with a sequence.
sage: Fourier.ifft([95,20,-23,20])
array([ 28.0+0.j, 29.5-0.j, 8.0+0.j, 29.5+0.j])
sage: Fourier.if
i want to write a polynomial p of variables x and y such that
p(x,y)=0
i also have that x and y can be expressed in terms of a variable u
such that
2x=2u^2+2u-1 and
-y^2=u^4+2u^3-2u-1
how to write code to eliminate u, hence finding p
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no i dont think so
i saved it as file.sage
then ran it as sage file.sage
so how do i apply this particular patch to my version of sage and then
run it as part of sage
On Nov 5, 7:18 pm, Mike Hansen wrote:
> On Fri, Nov 5, 2010 at 12:14 PM, andrew ewart
>
> wrote:
> > looking at the code in tick
On Fri, Nov 5, 2010 at 12:14 PM, andrew ewart
wrote:
> looking at the code in ticket 7458 (link:http://trac.sagemath.org/
> sage_trac/attachment/ticket/7458/sylvester.patch)
>
> however sage doesnt seem to recognise the sylvester_matrix command
> any help
Did you apply the patch and run "sage -b"
looking at the code in ticket 7458 (link:http://trac.sagemath.org/
sage_trac/attachment/ticket/7458/sylvester.patch)
ive tried to calculate the sylvester matrix of a given f and g (polys
of (x,a)) and its deteminant (with respect to a) with the following
code
R. = PolynomialRing(ZZ)
f = x^5 + 3*x
I did a quick search but couldn't find any recent discussion on this
topic.
Has axes labels for 3D plots implemented?
There seems to be a new feature in Jmol 12 for axes labelling.
What is it? Can we use it in SAGE? If so, how?
Thanks in advance
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> Are there any Sage functions and/or classes for computing Newton
> Polygons?
Yes there are, here's some quick examples.
sage: R. = PolynomialRing(QQ)
sage: p = 1 + x + y + x^2*y
sage: P = p.newton_polytope()
sage: P.vertices()
[[2, 1], [1, 0], [0, 1], [0, 0]]
sage: P.show()
# picture of newton
Are there any Sage functions and/or classes for computing Newton
Polygons?
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To use Polyhedron you would do:
p = Polyhedron(ieqs = [[0,1,0,1,-1], [0,-1,-3,0,0]],eqns =
[[0,1,-1,-1,0]])
It would be nice to have some conversion function from symbolic
inequalities and equations into this format; I don't think we have
that now but I could be wrong.
-M. Hampton
On Nov 4, 4:3
Hello everybody !!!
I am trying to use Valgrind in Sage, and I guess I did not do anything
wrong as I obediently followed
http://wiki.sagemath.org/ValgrindingSage
which just amounted to define a variable, but when I type sage
-valgrind the only thing I get is a message valgrind is being used,
th
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