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Some basic ideal operations are unsupported when `QQbar` is the base field:
```
sage: R. = QQbar[]
sage: I = ideal(x,z)
sage: J = ideal(R(1))
```
Now, both quotient and saturation:
```
sage: I.q…
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Eventually the class needs to be converted to a module. We are still working with the Groebner class instead of the groebner_basis.py file, the latter of which is very outdated.
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I have been experiencing unpredictable behavior with Z3 version 4.4.1.
I'm attaching four files (very large, sorry).
Basically, the problem I have is something like this:
A formula like this o…
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Dear Chris,
Thank you for this package!
I downloaded the packages and tried your example. I got the following error message:
```
Magma V2.21-2 Wed Nov 1 2017 21:23:14 [Seed = 848384097]
…
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There are a number of things that could use some polish. This is just to fix the issues I see.
CC: @sagetrac-dperkinson
Component: **documentation**
Author: **Travis Scrimshaw**
Branch/Commit: …
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Hi Chris,
I defined an hyperelliptic curve over an imaginary quadratic field. While "OddConductor" works fine on it, Conductor_Genus2 does not accept the input and EvenConductorExponent_Genus2 gives …
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The following
R=QQ[x,Inverses=>true,MonomialOrder=>RevLex]
R/ideal(x-1)
results in M2 getting stuck (the function rawQuotientRing line 195 of quotring.m2 never returns).
If (as I suspect) quotient …
pzinn updated
7 years ago
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Hecke algebras use adhoc caching which causes trouble for #11895. This ticket replaces some of the caching with `CachedRepresentation` and `cached_method`.
Depends on #15692
Component: **modular f…
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As discussed at #6051. Line 91 of sage/rings/polynomial/toy_d_basis.py needs to be unrandomed when this is fixed.
```
However, when we compute the Groebner basis of I (defined over `\ZZ`), we note…
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When using the `testConcreteFiles` function from `hakaru/haskell/Tests/TestTools`, a "Missing common type" error occurs for some files. We cannot figure out where this error is being triggered from. T…