-
Hi,
I was looking at the classes representing finite fields and I've noticed two major issues.
First: as far as I know, the FiniteField class can represent only Z/(p) fields, which is counterintuitiv…
-
I am doing a state-of-the-art of the existing libraries on GPU, and I stumbled upon your project.
What exactly finite fields are supported ? Only fields of characteristic 2 ?
Extension or only prime…
-
Anyone doing any kind of crypto calculation would probably appreciate having a finite field implementation in Spire.
-
Hello,
Thank you for the implementation, I found it useful. I am wondering if the implementation could be adapted to work in finite fields? In particular I am interested in JC decompositions of bin…
-
According to #9544 sympy still doesn't support finite fields of the form GF(p^m). I need to factorise and divide polynomials over GF(2^m). Would writing my own domain (or any other such hack) allow me…
-
As far as I understand, the focus of this project is ECC, even though other uses of finite field arithmetic are supported (Poly1305). Is it easily possible to support finite fields large enough that D…
-
supersedes #23316.
The [GitLab](../wiki/GitLab) MR is here: https://gitlab.com/sagemath/sage/-/merge_requests/33
Depends on #21413
Depends on #26105
Depends on #33373
Component: **finit…
-
Given a homormorphism, a prime `p`, and a degree `n`. Returns a table of the ratio of periodic
points to the number of points in a field of size `p^n`, as it cycles through the range of…
-
Current implementation for checking whether a rational map is chebyshev only works for number fields. See https://github.com/sagemath/sage-prod/issues/28292
CC: @Arnabds
Component: **dynamics**…
-
I noticed the following with Sage 4.3.5:
```
sage: R = GF(9,name='x')
sage: Q. = PolynomialRing(GF(3))
sage: R2 = GF(9,name='x',modulus=x^2+1)
sage: a=R(x+1)
sage: R2(a)
---------------------------…