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Regular polytopes A curious topological result in euclidean spaces is the number of possible regular polytopes in n dimensions. The series (starting with dimension 0) goes like this:
1 1 ∞ 5 6 3 3 3…
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cc @[ariostas](https://github.com/ariostas)
(Maybe we could even go beyond dimension 3,4,5?)
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The following bug seems to be present when using Jupyter Lab notebooks:
Writing
```
using Polymake;
p2 = @pm polytope.Polytope{}(POINTS=[1 -1 -1; 1 1 -1; 1 -1 1; 1 1 1; 1 0 0], INPUT_LINEALITY=[0 …
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There are three classes of n-dimensional regular polytopes ("polyhedra") that exist for all n: the hypercube, its dual the cross-polytope, and the simplex (the n-D analogues of the cube, octahedron an…
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In [1] a method is proposed to convert (exactly) an arbitrary polytope to the intersection of zonotopes.
It would be interesting to add this method. One application is to make a convenient overappr…
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First of all, thanks a lot for this piece of software. I was looking quite a while to find something like this.
Besides the minimal distance between two polytopes I am also interested in the points…
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# Short Description of the issue
In our workflow, output from [DT Flood Early Warning](https://www.intertwin.eu/intertwin-use-case-flood-early-warning-in-coastal-and-inland-regions/) and [DT Flood …
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Currently, our best polytope visualization option is to export a blob of Mathematica code for the user to run. This is not great.
I looked at a couple of python packages that draw polytopes, but I …
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### Description
The Weyl chamber is a handy geometric interpretation of different two-qubit quantum gates. All two-qubit quantum gates (e.g. CNOT, sqrt(CNOT), iSWAP, SWAP, etc.) have a coordinate i…
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Setup:
- Have a 1m x 1m x 1m box located at
- defined using fcl::boxd type
- Convex hull of meshed sphere [sphere128.stl.txt](https://github.com/flexible-collision-library/fcl/files/2251842/sp…