The császár polyhedron is a 3-dimensional polyhedron that exists as a tiling of the torus. The szilassi polyhedron, another tiling of the torus, is its dual.
Structure and Sections
The császár polyhedron has seven vertices, with every vertex connected to every other vertex. This property is shared with the tetrahedron.
Subfacets
- 7 points (0D)
- 21 line segments (1D)
- 14 triangles (2D)
- 1 császár polyhedron (3D)
