Dear all,
I am searching lattice reduction for polynomial matrices in Sage.
Kindly help me.
T. Mulders and A. Storjohann. On lattice reduction for polynomial matrices.
Journal of Symbolic Computation, 35(4):377 – 401, 2003
On 20 February 2017 at 21:19, Santanu Sarkar
wrote:
> Dear all,
>
it might be (if you don't have Sage in your PATH) that you will need to run
(in terminal)
/Applications/SageMath-7.5.1.app/sage -i database_odlyzko_zeta
rather than just
sage -i database_odlyzko_zeta
On Tuesday, February 21, 2017 at 12:09:06 AM UTC, Andrew wrote:
>
> Open up a terminal win
Open up a terminal window and type:
sage -i database_odlyzko_zeta
On Tuesday, 21 February 2017 09:14:58 UTC+11, Fernando Montans wrote:
>
>
>
> I want to use zeta_zeros() on a macbook running OS X 10.12 with Sage 7.5.1
> already installed and working quite fine.
>
>
> According to the documenta
I want to use zeta_zeros() on a macbook running OS X 10.12 with Sage 7.5.1
already installed and working quite fine.
According to the documentation:
In order to use zeta_zeros(), you will need to install the optional Odlyzko
database package:
sage -i database_odlyzko_zeta
I need more spe
I'm not sure what I would expect to see, but the following produces
something I would not expect:
region_plot([x <> 1], (x,-2,2), (y,-2,2))
The output has the region left of x=1 shaded, but not the region right of
x=1. Similar "one-sided" results with
region_plot([x <> y], (x,-2,2), (y,-2,2))
Dear all,
I have polynomial lattice over a finite field. So each component of the
vectors v_1, v_2, v_3 are polynomials over a finite field say F_11. Hence
v_1=(f_1(x), f_2(x), f_3(x)), v_2=(g_1(x), g_2(x), g_3(x)) and
v_3=(h_1(x), h_2(x), h_3(x)). Here norm is the maximum degree of each
compo
Hello,
I am Asutosh from CET, Bhubaneswar, India. I would like to be a part of
the community and make pull requests for the same.
- full name: Asutosh Hota
- Username: asutosh7hota
- contact email: asutosh.h...@gmail.com
- reason: I am new to the community and I want to make some
