-
It seems to me that the following computation is a problem; namely, that the lead term ideal and the Groebner basis should have the same number of elements.
R = ZZ/32003[x_6,x_5,x_4,x_3,x_2,x_1,x_0…
-
The aim of this ticket is to provide a new version of the optional `p_group_cohomology` spkg so that it builds and passes tests both with python-2 and python-3.
Hopefully the version number 3.3 (tw…
-
In #33950, free (graded) resolutions for modules over polynomial rings were added. However, one needs to import a top-level function to do the construction. The goal of this ticket is to add a metho…
-
Seen on CI for macOS, julia 1.6.
```julia
polymake: WARNING: rule _4ti2.hilbert, _4ti2.integer_points: HILBERT_BASIS_GENERATORS : CONE_AMBIENT_DIM , FACETS | INEQUALITIES failed: couldn't run 4ti2:…
-
Try the following code in julia:
`using Oscar`
`R, vars = QQ["x","y"]`
`x = vars[1]`
`y = vars[2]`
`I = ideal(R, [zero(R)] )`
`Q, proj = quo(R,I)`
`f = proj(x*y)`
`# This command works:`
…
-
consider the following:
```
i1 : R=QQ[a_0..a_4,SkewCommutative=>toList(0..4)]
o1 = R
o1 : PolynomialRing
i2 : I=ideal (a_0,a_2,a_1*a_3)
o2 = ideal (a , a , a a )
0 2 1 …
pzinn updated
2 years ago
-
### Describe the bug
When I open Isabelle for the first time, I can't proceed because Isabelle needs to build HOL.
Here is the error I get from the "Isabelle build" window:
```
Build started for…
-
Here is a small example illustrating the issue.
The memory footprint of the following piece of code grows indefinitely.
```
sage: K = GF(1
-
To avoid having a big TOC, I propose categorizing the modules in the SymPy Modules Reference section of the documentation.
cc @asmeurer @oscarbenjamin
-
There might be something not immediately apparent but I couldn't find any lit tests in the repository.
Trying to run the test suite as per the README,
```
$ pip install lit OutputCheck
$ lit b…