Square tiling honeycomb
In the geometry of hyperbolic 3-space, the square tiling honeycomb is one of 11 paracompact regular honeycombs. It is called paracompact because it has infinite cells, whose vertices exist on horospheres and converge to a single ideal point at infinity. Given by Schläfli symbol, it has three square tilings,, around each edge, and six square tilings around each vertex, in a cubic vertex figure.
Rectified order-4 square tiling
It is also seen as a rectified order-4 square tiling honeycomb, r:| order-4 square tiling honeycomb| | r = |
| = | |
Symmetry
The square tiling honeycomb has three reflective symmetry constructions: as a regular honeycomb, a half symmetry construction ↔, and lastly a construction with three types of checkered square tilings ↔.It also contains an index 6 subgroup ↔ , and a radial subgroup of index 48, with a right dihedral-angled octahedral fundamental domain, and four pairs of ultraparallel mirrors:.
This honeycomb contains that tile 2-hypercycle surfaces, which are similar to the paracompact order-3 apeirogonal tiling :
Related polytopes and honeycombs
The square tiling honeycomb is a regular hyperbolic honeycomb in 3-space. It is one of eleven regular paracompact honeycombs.There are fifteen uniform honeycombs in the Coxeter group family, including this regular form, and its dual, the order-4 octahedral honeycomb,.
The square tiling honeycomb is part of the order-4 square tiling honeycomb family, as it can be seen as a rectified order-4 square tiling honeycomb.
It is related to the 24-cell,, which also has a cubic vertex figure.
It is also part of a sequence of honeycombs with square tiling cells:
Rectified square tiling honeycomb
The rectified square tiling honeycomb, t1, has cube and square tiling facets, with a triangular prism vertex figure.It is similar to the 2D hyperbolic uniform triapeirogonal tiling, r, with triangle and apeirogonal faces.