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Manipulation of tilings and polyhedra using Python and Antiprism

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Documentation Status

antitile

Manipulation of polyhedra and tilings using Python. This package is designed to work with Antiprism but can be used on its own.

Installation

pip3 install git+git://github.com/brsr/antitile.git

Usage

The package includes a number of scripts.

  • gcopoly.py: The Goldberg-Coxeter subdivision operation of tilings
  • balloon.py: Balloon tiling of the sphere
  • cellular.py: Colors polyhedra using cellular automata
  • gcostats.py: Statistics of the polyhedra/tiling, focused on the use of GCO to model the sphere (see also off_report in Antiprism)
  • view_off.py: A viewer for OFF files using matplotlib, allowing for export to SVG (see also antiview in Antiprism)
  • factor.py: Factors Gaussian, Eisenstein, Steineisen (Eisenstein expressed with the 6th root of unity instead of 3rd), and regular integers.

Some Jupyter notebooks exploring various aspects of these programs are included in the misc folder in the source, as well as some OFF files for simple polyhedra including the 3- and 4-dihedra.

Examples

Statistics of a geodesic polyhedron (created using what geodesic dome people call Method 1):

gcopoly.py -a 5 -b 3 icosahedron.off | sgsstats.py

Visualize a Goldberg polyhedron, with color:

gcopoly.py -a 5 -b 3 icosahedron.off | off_color -v M -m group_color.txt | pol_recip | view_off.py

Create a quadrilateral-faced similar grid subdivision polyhedron, put it into canonical form (so the faces are all flat), and color it using Conway's Game of Life with random initial condition:

gcopoly.py -a 5 -b 3 cube.off | canonical | off_color test.off -f n | cellular.py -v -b=3 -s=2,3
view_off.py cellular100.off
# or whatever the last file is if it reaches steady state early

gcopoly.py can subdivide non-orientable surfaces too, at least for Class I and II subdivisions. Here, the base is a Möbius strip-like surface with 12 faces:

unitile2d 2 -s m -w 4 -l 1 | gcopoly.py -a 2 -b 2 -n | view_off.py

A quadrilateral balloon polyhedra, which happens to resemble a peeled coconut:

balloon.py 8 -pql | view_off.py

For Contributors

This code makes heavy use of vectorized operations on NumPy multidimensional arrays, which are honestly pretty impenetrable until you get familiar with them. (And, uh, even after that.) I use the convention that the last axis of an array specifies the spatial coordinates:

x, y, z = v[..., 0], v[..., 1], v[..., 2]