Construction of the Koebe polyhedron for a given 3-connected planar graph.
For each combinatorial type of convex 3-dimensional polyhedra, there exists a unique representative with the following properties:
1. All edges are tangent to the unit sphere.
2. The barycenter of the points where the edges touch the sphere is the origin.
This application constructs this Koebe polyhedron for a given 3-connected planar graph.
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