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