| Tetragonal disphenoid tetrahedral honeycomb | |
|---|---|
| |
| Type | convex uniform honeycomb dual |
| Coxeter-Dynkin diagram |    
|
| Cell type |  Tetragonal disphenoid |
| Face types | isosceles triangle {3} |
| Vertex figure |  tetrakis hexahedron
|
| Space group | Im3m (229) |
| Symmetry | [[4, 3, 4]] |
| Coxeter group | , [4, 3, 4] |
| Dual | Bitruncated cubic honeycomb |
| Properties | cell-transitive, face-transitive, vertex-transitive |
The tetragonal disphenoid tetrahedral honeycomb is a space-filling tessellation (or honeycomb) in Euclidean 3-space made up of identical tetragonal disphenoidal cells. Cells are face-transitive with 4 identical isosceles triangle faces. John Horton Conway calls it an oblate tetrahedrille or shortened to obtetrahedrille.[1]
A cell can be seen as 1/12 of a translational cube, with its vertices centered on two faces and two edges. Four of its edges belong to 6 cells, and two edges belong to 4 cells.
The tetrahedral disphenoid honeycomb is the dual of the uniform bitruncated cubic honeycomb.
Its vertices form the A*
3 / D*
3 lattice, which is also known as the body-centered cubic lattice.
- ^ Symmetry of Things, Table 21.1. Prime Architectonic and Catopric tilings of space, p. 293, 295.