Tetragonal disphenoid honeycomb
| 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 this honeycomb a oblate tetrahedrille.
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.
Contents
Geometry
This honeycomb's vertex figure is a tetrakis cube: 24 disphenoids meet at each vertex. The union of these 24 disphenoids forms a rhombic dodecahedron. Each edge of the tessellation is surrounded by either four or six disphenoids, according to whether it forms the base or one of the sides of its adjacent isosceles triangle faces respectively. When an edge forms the base of its adjacent isosceles triangles, and is surrounded by four disphenoids, they form an irregular octahedron. When an edge forms one of the two equal sides of its adjacent isosceles triangle faces, the six disphenoids surrounding the edge form a special type of parallelepiped called a trigonal trapezohedron.
An orientation of the tetragonal disphenoid honeycomb can be obtained by starting with a cubic honeycomb, subdividing it at the planes 
, 
, and 
(i.e. subdividing each cube into path-tetrahedra), then squashing it along the main diagonal until the distance between the points (0, 0, 0) and (1, 1, 1) becomes the same as the distance between the points (0, 0, 0) and (0, 0, 1).
Hexakis cubic honeycomb
| Hexakis cubic honeycomb | |
|---|---|
| 250px | |
| Type | Dual uniform honeycomb |
| Coxeter–Dynkin diagrams | |
| Cell | Isosceles square pyramid  |
| Faces | Triangle square |
| Space group Fibrifold notation |
Pm3m (221) 4−:2 |
| Coxeter group | , [4,3,4] |
| vertex figures |  30px, |
| Dual | Truncated cubic honeycomb |
| Properties | Cell-transitive |
The hexakis cubic honeycomb is a uniform space-filling tessellation (or honeycomb) in Euclidean 3-space. It can be seen as a cubic honeycomb with each cube subdivided by a center point into 6 elongated square pyramid cells.
John Horton Conway calls this honeycomb a pyramidille.
There are two types of planes of faces: one as a square tiling, and flattened triangular tiling with half of the triangles removed as holes.
| Tiling plane |
 |
150px |
|---|---|---|
| Symmetry | p4m, [4,4] (*442) | pmm, [∞,2,∞] (*2222) |
Related honeycombs
It is dual to the truncated cubic honeycomb with octahedral and truncated cubic cells:
If the square pyramids of the pyramidille are joined on their bases, another honeycomb is created with identical vertices and edges, called a square bipyramidal honeycomb or oblate octahedrille, or the dual of the rectified cubic honeycomb.
It is analogous to the 2-dimensional tetrakis square tiling:
Square bipyramidal honeycomb
| Square bipyramidal honeycomb | |
|---|---|
| 280px | |
| Type | Dual uniform honeycomb |
| Coxeter–Dynkin diagrams | |
| Cell | Square bipyramids  |
| Faces | Triangles |
| Space group Fibrifold notation |
Pm3m (221) 4−:2 |
| Coxeter group | , [4,3,4] |
| vertex figures | 30px, |
| Dual | Rectified cubic honeycomb |
| Properties | Cell-transitive, Face-transitive |
The square bipyramidal honeycomb is a uniform space-filling tessellation (or honeycomb) in Euclidean 3-space. John Horton Conway calls it an oblate octahedrille.
It can be seen as a cubic honeycomb with each cube subdivided by a center point into 6 elongated square pyramid cells. The original cubic honeycomb walls are removed, joining pairs of square pyramids into elongated square bipyramids (octahedron). Its vertex and edge framework is identical to the hexakis cubic honeycomb.
There is one type of plane with faces: a flattended triangular tiling with half of the triangles as holes. These cut face-diagonally through the original cubes. There are also square tiling plane that exist as nonface holes passing through the centers of the octahedral cells.
| Tiling plane |
140px Square tiling "holes" |
150px flattened triangular tiling |
|---|---|---|
| Symmetry | p4m, [4,4] (*442) | pmm, [∞,2,∞] (*2222) |
Related honeycombs
It is dual to the rectified cubic honeycomb with octahedral and cuboctahedral cells:
Phyllic disphenoidal honeycomb
| Phyllic disphenoidal honeycomb | |
|---|---|
| (No image) | |
| Type | Dual uniform honeycomb |
| Coxeter-Dynkin diagrams | |
| Cell |  Phyllic disphenoid |
| Faces | Rhombus Triangle |
| Space group Fibrifold notation Coxeter notation |
Im3m (229) 8o:2 [[4,3,4]] |
| Coxeter group | [4,3,4], |
| vertex figures |   ,  |
| Dual | Omnitruncated cubic honeycomb |
| Properties | Cell-transitive, face-transitive |
The phyllic disphenoidal honeycomb is a uniform space-filling tessellation (or honeycomb) in Euclidean 3-space. John Horton Conway calls it an eighth pyramidille.
Related honeycombs
It is dual to the omnitruncated cubic honeycomb:
See also
References
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