Convex uniform honeycomb

File:Tetrahedral-octahedral honeycomb.png

The alternated cubic honeycomb is one of 28 space-filling uniform tessellations in Euclidean 3-space, composed of alternating yellow tetrahedra and red octahedra.

In geometry, a convex uniform honeycomb is a uniform tessellation which fills three-dimensional Euclidean space with non-overlapping convex uniform polyhedral cells.

Twenty-eight such honeycombs are known:

the familiar cubic honeycomb and 7 truncations thereof;
the alternated cubic honeycomb and 4 truncations thereof;
10 prismatic forms based on the uniform plane tilings (11 if including the cubic honeycomb);
5 modifications of some of the above by elongation and/or gyration.

They can be considered the three-dimensional analogue to the uniform tilings of the plane.

The Voronoi diagram of any lattice forms a convex uniform honeycomb in which the cells are zonohedra.

HistoryEdit

1900: Thorold Gosset enumerated the list of semiregular convex polytopes with regular cells (Platonic solids) in his publication On the Regular and Semi-Regular Figures in Space of n Dimensions, including one regular cubic honeycomb, and two semiregular forms with tetrahedra and octahedra.
1905: Alfredo Andreini enumerated 25 of these tessellations.
1991: Norman Johnson's manuscript Uniform Polytopes identified the list of 28.<ref name=OEIS/>
1994: Branko Grünbaum, in his paper Uniform tilings of 3-space, also independently enumerated all 28, after discovering errors in Andreini's publication. He found the 1905 paper, which listed 25, had 1 wrong, and 4 being missing. Grünbaum states in this paper that Norman Johnson deserves priority for achieving the same enumeration in 1991. He also mentions that I. Alexeyev of Russia had contacted him regarding a putative enumeration of these forms, but that Grünbaum was unable to verify this at the time.
2006: George Olshevsky, in his manuscript Uniform Panoploid Tetracombs, along with repeating the derived list of 11 convex uniform tilings, and 28 convex uniform honeycombs, expands a further derived list of 143 convex uniform tetracombs (Honeycombs of uniform 4-polytopes in 4-space).<ref>George Olshevsky, (2006, Uniform Panoploid Tetracombs, Manuscript (Complete list of 11 convex uniform tilings, 28 convex uniform honeycombs, and 143 convex uniform tetracombs) [1]</ref><ref name=OEIS>Template:Cite OEIS</ref>

Only 14 of the convex uniform polyhedra appear in these patterns:

three of the five Platonic solids (the tetrahedron, cube, and octahedron),
six of the thirteen Archimedean solids (the ones with reflective tetrahedral or octahedral symmetry), and
five of the infinite family of prisms (the 3-, 4-, 6-, 8-, and 12-gonal ones; the 4-gonal prism duplicates the cube).

The icosahedron, snub cube, and square antiprism appear in some alternations, but those honeycombs cannot be realised with all edges unit length.

NamesEdit

This set can be called the regular and semiregular honeycombs. It has been called the Archimedean honeycombs by analogy with the convex uniform (non-regular) polyhedra, commonly called Archimedean solids. Recently Conway has suggested naming the set as the Architectonic tessellations and the dual honeycombs as the Catoptric tessellations.

The individual honeycombs are listed with names given to them by Norman Johnson. (Some of the terms used below are defined in Uniform 4-polytope#Geometric derivations for 46 nonprismatic Wythoffian uniform 4-polytopes)

For cross-referencing, they are given with list indices from Andreini (1-22), Williams(1–2,9-19), Johnson (11–19, 21–25, 31–34, 41–49, 51–52, 61–65), and Grünbaum(1-28). Coxeter uses δ₄ for a cubic honeycomb, hδ₄ for an alternated cubic honeycomb, qδ₄ for a quarter cubic honeycomb, with subscripts for other forms based on the ring patterns of the Coxeter diagram.

Compact Euclidean uniform tessellations (by their infinite Coxeter group families)Edit

File:Coxeter-Dynkin 3-space groups.png

Fundamental domains in a cubic element of three groups.

File:Coxeter diagram affine rank4 correspondence.png

Family correspondences

The fundamental infinite Coxeter groups for 3-space are:

The <math>{\tilde{C}}_3</math>, [4,3,4], cubic, Template:CDD (8 unique forms plus one alternation)
The <math>{\tilde{B}}_3</math>, [4,3^1,1], alternated cubic, Template:CDD (11 forms, 3 new)
The <math>{\tilde{A}}_3</math> cyclic group, [(3,3,3,3)] or [3^[4]], Template:CDD (5 forms, one new)

There is a correspondence between all three families. Removing one mirror from <math>{\tilde{C}}_3</math> produces <math>{\tilde{B}}_3</math>, and removing one mirror from <math>{\tilde{B}}_3</math> produces <math>{\tilde{A}}_3</math>. This allows multiple constructions of the same honeycombs. If cells are colored based on unique positions within each Wythoff construction, these different symmetries can be shown.

In addition there are 5 special honeycombs which don't have pure reflectional symmetry and are constructed from reflectional forms with elongation and gyration operations.

The total unique honeycombs above are 18.

The prismatic stacks from infinite Coxeter groups for 3-space are:

The <math>{\tilde{C}}_2</math>×<math>{\tilde{I}}_1</math>, [4,4,2,∞] prismatic group, Template:CDD (2 new forms)
The <math>{\tilde{G}}_2</math>×<math>{\tilde{I}}_1</math>, [6,3,2,∞] prismatic group, Template:CDD (7 unique forms)
The <math>{\tilde{A}}_2</math>×<math>{\tilde{I}}_1</math>, [(3,3,3),2,∞] prismatic group, Template:CDD (No new forms)
The <math>{\tilde{I}}_1</math>×<math>{\tilde{I}}_1</math>×<math>{\tilde{I}}_1</math>, [∞,2,∞,2,∞] prismatic group, Template:CDD (These all become a cubic honeycomb)

In addition there is one special elongated form of the triangular prismatic honeycomb.

The total unique prismatic honeycombs above (excluding the cubic counted previously) are 10.

Combining these counts, 18 and 10 gives us the total 28 uniform honeycombs.

The C̃₃, [4,3,4] group (cubic)Edit

The regular cubic honeycomb, represented by Schläfli symbol {4,3,4}, offers seven unique derived uniform honeycombs via truncation operations. (One redundant form, the runcinated cubic honeycomb, is included for completeness though identical to the cubic honeycomb.) The reflectional symmetry is the affine Coxeter group [4,3,4]. There are four index 2 subgroups that generate alternations: [1⁺,4,3,4], [(4,3,4,2⁺)], [4,3⁺,4], and [4,3,4]⁺, with the first two generated repeated forms, and the last two are nonuniform.

Template:C3 honeycombs

[4,3,4], space group PmTemplate:Overlinem (221)
Reference Indices	Honeycomb name Coxeter diagram and Schläfli symbol	Cell counts/vertex and positions in cubic honeycomb						Frames (Perspective)	Vertex figure	Dual cell
Reference Indices	Honeycomb name Coxeter diagram and Schläfli symbol	(0) Template:CDD	(1) Template:CDD	(2) Template:CDD	(3) Template:CDD	Alt	Solids (Partial)	Frames (Perspective)	Vertex figure	Dual cell
J_11,15 A₁ W₁ G₂₂ δ₄	cubic (chon) Template:CDD t₀{4,3,4} {4,3,4}				(8) File:Hexahedron.png (4.4.4)		File:Partial cubic honeycomb.png	File:Cubic honeycomb.png	File:Cubic honeycomb verf.svg octahedron	File:Cubic full domain.png Cube, Template:CDD
J_12,32 A₁₅ W₁₄ G₇ O₁	rectified cubic (rich) Template:CDD t₁{4,3,4} r{4,3,4}	(2) File:Octahedron.png (3.3.3.3)			(4) File:Cuboctahedron.png (3.4.3.4)		File:Rectified cubic honeycomb.png	File:Rectified cubic tiling.png	File:Rectified cubic honeycomb verf.png cuboid	File:Cubic square bipyramid.png Square bipyramid Template:CDD
J₁₃ A₁₄ W₁₅ G₈ t₁δ₄ O₁₅	truncated cubic (tich) Template:CDD t_0,1{4,3,4} t{4,3,4}	(1) File:Octahedron.png (3.3.3.3)			(4) File:Truncated hexahedron.png (3.8.8)		File:Truncated cubic honeycomb.png	File:Truncated cubic tiling.png	File:Truncated cubic honeycomb verf.png square pyramid	File:Cubic square pyramid.png Isosceles square pyramid
J₁₄ A₁₇ W₁₂ G₉ t_0,2δ₄ O₁₄	cantellated cubic (srich) Template:CDD t_0,2{4,3,4} rr{4,3,4}	(1) File:Cuboctahedron.png (3.4.3.4)	(2) File:Hexahedron.png (4.4.4)		(2) File:Small rhombicuboctahedron.png (3.4.4.4)		File:Cantellated cubic honeycomb.jpg	File:Cantellated cubic tiling.png	File:Cantellated cubic honeycomb verf.png oblique triangular prism	File:Quarter oblate octahedrille cell.png Triangular bipyramid
J₁₇ A₁₈ W₁₃ G₂₅ t_0,1,2δ₄ O₁₇	cantitruncated cubic (grich) Template:CDD t_0,1,2{4,3,4} tr{4,3,4}	(1) File:Truncated octahedron.png (4.6.6)	(1) File:Hexahedron.png (4.4.4)		(2) File:Great rhombicuboctahedron.png (4.6.8)		File:Cantitruncated Cubic Honeycomb.svg	File:Cantitruncated cubic tiling.png	File:Cantitruncated cubic honeycomb verf.png irregular tetrahedron	File:Triangular pyramidille cell1.png Triangular pyramidille
J₁₈ A₁₉ W₁₉ G₂₀ t_0,1,3δ₄ O₁₉	runcitruncated cubic (prich) Template:CDD t_0,1,3{4,3,4}	(1) File:Small rhombicuboctahedron.png (3.4.4.4)	(1) File:Hexahedron.png (4.4.4)	(2) File:Octagonal prism.png (4.4.8)	(1) File:Truncated hexahedron.png (3.8.8)		File:Runcitruncated cubic honeycomb.jpg	File:Runcitruncated cubic tiling.png	File:Runcitruncated cubic honeycomb verf.png oblique trapezoidal pyramid	File:Square quarter pyramidille cell.png Square quarter pyramidille
J_21,31,51 A₂ W₉ G₁ hδ₄ O₂₁	alternated cubic (octet) Template:CDD h{4,3,4}				(8) File:Tetrahedron.png (3.3.3)	(6) File:Octahedron.png (3.3.3.3)	File:Tetrahedral-octahedral honeycomb.png	File:Alternated cubic tiling.png	File:Alternated cubic honeycomb verf.svg cuboctahedron	File:Dodecahedrille cell.png Dodecahedrille
J_22,34 A₂₁ W₁₇ G₁₀ h₂δ₄ O₂₅	Cantic cubic (tatoh) Template:CDD ↔ Template:CDD	(1) File:Cuboctahedron.png (3.4.3.4)			(2) File:Truncated tetrahedron.png (3.6.6)	(2) File:Truncated octahedron.png (4.6.6)	File:Truncated Alternated Cubic Honeycomb.svg	File:Truncated alternated cubic tiling.png	File:Truncated alternated cubic honeycomb verf.png rectangular pyramid	File:Half oblate octahedrille cell.png Half oblate octahedrille
J₂₃ A₁₆ W₁₁ G₅ h₃δ₄ O₂₆	Runcic cubic (sratoh) Template:CDD ↔ Template:CDD	(1) File:Hexahedron.png (4.4.4)			(1) File:Tetrahedron.png (3.3.3)	(3) File:Small rhombicuboctahedron.png (3.4.4.4)	File:Runcinated alternated cubic honeycomb.jpg	File:Runcinated alternated cubic tiling.png	File:Runcinated alternated cubic honeycomb verf.png tapered triangular prism	File:Quarter cubille cell.png Quarter cubille
J₂₄ A₂₀ W₁₆ G₂₁ h_2,3δ₄ O₂₈	Runcicantic cubic (gratoh) Template:CDD ↔ Template:CDD	(1) File:Truncated hexahedron.png (3.8.8)			(1) File:Truncated tetrahedron.png (3.6.6)	(2) File:Great rhombicuboctahedron.png (4.6.8)	File:Cantitruncated alternated cubic honeycomb.png	File:Cantitruncated alternated cubic tiling.png	File:Runcitruncated alternate cubic honeycomb verf.png Irregular tetrahedron	File:Half pyramidille cell.png Half pyramidille
Nonuniform_b	snub rectified cubic (serch) Template:CDD sr{4,3,4}	(1) File:Uniform polyhedron-43-h01.svg (3.3.3.3.3) Template:CDD	(1) File:Tetrahedron.png (3.3.3) Template:CDD		(2) File:Snub hexahedron.png (3.3.3.3.4) Template:CDD	(4) File:Tetrahedron.png (3.3.3)	File:Alternated cantitruncated cubic honeycomb.png		File:Alternated cantitruncated cubic honeycomb verf.png Irr. tridiminished icosahedron
Nonuniform	Cantic snub cubic (casch) Template:CDD 2s₀{4,3,4}	(1) File:Uniform polyhedron-43-h01.svg (3.3.3.3.3) Template:CDD			(2) File:Rhombicuboctahedron uniform edge coloring.png (3.4.4.4) Template:CDD	(3) File:Triangular prism.png (3.4.4)
Nonuniform	Runcicantic snub cubic (rusch) Template:CDD	(1) File:Cuboctahedron.png (3.4.3.4)	(2) File:Cube rotorotational symmetry.png (4.4.4)	(1) File:Tetrahedron.png (3.3.3)	(1) File:Truncated tetrahedron.png (3.6.6)	(3) File:Triangular cupola.png Tricup
Nonuniform	Runcic cantitruncated cubic (esch) Template:CDD sr₃{4,3,4}	(1) File:Snub hexahedron.png (3.3.3.3.4) Template:CDD	(1) File:Tetragonal prism.png (4.4.4) Template:CDD	(1) File:Cube rotorotational symmetry.png (4.4.4) Template:CDD	(1) File:Rhombicuboctahedron uniform edge coloring.png (3.4.4.4) Template:CDD	(3) File:Triangular prism.png (3.4.4)

Template:Brackets honeycombs, space group ImTemplate:Overlinem (229)
Reference Indices	Honeycomb name Coxeter diagram Template:CDD and Schläfli symbol	Cell counts/vertex and positions in cubic honeycomb			Solids (Partial)	Frames (Perspective)	Vertex figure	Dual cell
Reference Indices		(0,3) Template:CDD Template:CDD	(1,2) Template:CDD Template:CDD	Alt	Solids (Partial)	Frames (Perspective)	Vertex figure	Dual cell
J_11,15 A₁ W₁ G₂₂ δ₄ O₁	runcinated cubic (same as regular cubic) (chon) Template:CDD t_0,3{4,3,4}	(2) File:Hexahedron.png (4.4.4)	(6) File:Hexahedron.png (4.4.4)		File:Runcinated cubic honeycomb.png	File:Cubic honeycomb.png	File:Runcinated cubic honeycomb verf.png octahedron	File:Cubic full domain.png Cube
J₁₆ A₃ W₂ G₂₈ t_1,2δ₄ O₁₆	bitruncated cubic (batch) Template:CDD t_1,2{4,3,4} 2t{4,3,4}	(4) File:Truncated octahedron.png (4.6.6)			File:Bitruncated cubic honeycomb.png	File:Bitruncated cubic tiling.png	File:Bitruncated cubic honeycomb verf.png (disphenoid)	File:Oblate tetrahedrille cell.png Oblate tetrahedrille
J₁₉ A₂₂ W₁₈ G₂₇ t_0,1,2,3δ₄ O₂₀	omnitruncated cubic (gippich) Template:CDD t_0,1,2,3{4,3,4}	(2) File:Great rhombicuboctahedron.png (4.6.8)	(2) File:Octagonal prism.png (4.4.8)		File:Omnitruncated cubic honeycomb.jpg	File:Omnitruncated cubic tiling.png	File:Omnitruncated cubic honeycomb verf.png irregular tetrahedron	File:Fundamental tetrahedron1.png Eighth pyramidille
J_21,31,51 A₂ W₉ G₁ hδ₄ O₂₇	Quarter cubic honeycomb (cytatoh) Template:CDD ht₀ht₃{4,3,4}	(2) File:Uniform polyhedron-33-t0.png (3.3.3)	(6) File:Uniform polyhedron-33-t01.png (3.6.6)		File:Quarter cubic honeycomb2.png	File:Bitruncated alternated cubic tiling.png	File:T01 quarter cubic honeycomb verf2.png elongated triangular antiprism	File:Oblate cubille cell.png Oblate cubille
J_21,31,51 A₂ W₉ G₁ hδ₄ O₂₁	Alternated runcinated cubic (octet) (same as alternated cubic) Template:CDD ht_0,3{4,3,4}	(2) File:Uniform polyhedron-33-t0.png (3.3.3)	(6) File:Uniform polyhedron-33-t2.png (3.3.3)	(6) File:Uniform polyhedron-33-t1.svg (3.3.3.3)	File:Tetrahedral-octahedral honeycomb2.png	File:Alternated cubic tiling.png	File:Alternated cubic honeycomb verf.svg cuboctahedron
Nonuniform	Biorthosnub cubic honeycomb (gabreth) Template:CDD 2s_0,3{(4,2,4,3)}	(2) File:Truncated octahedron.png (4.6.6)	(2) File:Cube rotorotational symmetry.png (4.4.4)	(2) File:Cantic snub hexagonal hosohedron2.png (4.4.6)
Nonuniform_a	Alternated bitruncated cubic (bisch) Template:CDD h2t{4,3,4}	File:Uniform polyhedron-43-h01.svg (4) (3.3.3.3.3)		File:Tetrahedron.png (4) (3.3.3)	File:Alternated bitruncated cubic honeycomb2.png		File:Alternated bitruncated cubic honeycomb verf.png	File:Ten-of-diamonds decahedron in cube.png
Nonuniform	Cantic bisnub cubic (cabisch) Template:CDD 2s_0,3{4,3,4}	(2) File:Rhombicuboctahedron uniform edge coloring.png (3.4.4.4)	(2) File:Tetragonal prism.png (4.4.4)	(2) File:Cube rotorotational symmetry.png (4.4.4)
Nonuniform_c	Alternated omnitruncated cubic (snich) Template:CDD ht_0,1,2,3{4,3,4}	(2) File:Snub hexahedron.png (3.3.3.3.4)	(2) File:Square antiprism.png (3.3.3.4)	(4) File:Tetrahedron.png (3.3.3)			File:Snub cubic honeycomb verf.png

B̃₃, [4,3^1,1] groupEdit

The <math>{\tilde{B}}_3</math>, [4,3] group offers 11 derived forms via truncation operations, four being unique uniform honeycombs. There are 3 index 2 subgroups that generate alternations: [1⁺,4,3^1,1], [4,(3^1,1)⁺], and [4,3^1,1]⁺. The first generates repeated honeycomb, and the last two are nonuniform but included for completeness.

The honeycombs from this group are called alternated cubic because the first form can be seen as a cubic honeycomb with alternate vertices removed, reducing cubic cells to tetrahedra and creating octahedron cells in the gaps.

Nodes are indexed left to right as 0,1,0',3 with 0' being below and interchangeable with 0. The alternate cubic names given are based on this ordering.

Template:B3 honeycombs

[4,3^1,1] uniform honeycombs, space group FmTemplate:Overlinem (225)
Referenced indices	Honeycomb name Coxeter diagrams	Cells by location (and count around each vertex)				Solids (Partial)	Frames (Perspective)	vertex figure
Referenced indices	Honeycomb name Coxeter diagrams	(0) Template:CDD	(1) Template:CDD	(0') Template:CDD	(3) Template:CDD	Solids (Partial)	Frames (Perspective)	vertex figure
J_21,31,51 A₂ W₉ G₁ hδ₄ O₂₁	Alternated cubic (octet) Template:CDD ↔ Template:CDD			File:Octahedron.png (6) (3.3.3.3)	File:Tetrahedron.png(8) (3.3.3)	File:Tetrahedral-octahedral honeycomb.png	File:Alternated cubic tiling.png	File:Alternated cubic honeycomb verf.svg cuboctahedron
J_22,34 A₂₁ W₁₇ G₁₀ h₂δ₄ O₂₅	Cantic cubic (tatoh) Template:CDD ↔ Template:CDD	File:Cuboctahedron.png (1) (3.4.3.4)		File:Truncated octahedron.png (2) (4.6.6)	File:Truncated tetrahedron.png (2) (3.6.6)	File:Truncated Alternated Cubic Honeycomb.svg	File:Truncated alternated cubic tiling.png	File:Truncated alternated cubic honeycomb verf.png rectangular pyramid
J₂₃ A₁₆ W₁₁ G₅ h₃δ₄ O₂₆	Runcic cubic (sratoh) Template:CDD ↔ Template:CDD	File:Hexahedron.png (1) cube		File:Small rhombicuboctahedron.png (3) (3.4.4.4)	File:Tetrahedron.png (1) (3.3.3)	File:Runcinated alternated cubic honeycomb.jpg	File:Runcinated alternated cubic tiling.png	File:Runcinated alternated cubic honeycomb verf.png tapered triangular prism
J₂₄ A₂₀ W₁₆ G₂₁ h_2,3δ₄ O₂₈	Runcicantic cubic (gratoh) Template:CDD ↔ Template:CDD	File:Truncated hexahedron.png (1) (3.8.8)		File:Great rhombicuboctahedron.png(2) (4.6.8)	File:Truncated tetrahedron.png (1) (3.6.6)	File:Cantitruncated alternated cubic honeycomb.png	File:Cantitruncated alternated cubic tiling.png	File:Runcitruncated alternate cubic honeycomb verf.png Irregular tetrahedron

<[4,3^1,1]> uniform honeycombs, space group PmTemplate:Overlinem (221)
Referenced indices	Honeycomb name Coxeter diagrams Template:CDD ↔ Template:CDD	Cells by location (and count around each vertex)				Solids (Partial)	Frames (Perspective)	vertex figure
Referenced indices	Honeycomb name Coxeter diagrams Template:CDD ↔ Template:CDD	(0,0') Template:CDD	(1) Template:CDD	(3) Template:CDD	Alt	Solids (Partial)	Frames (Perspective)	vertex figure
J_11,15 A₁ W₁ G₂₂ δ₄ O₁	Cubic (chon) Template:CDD ↔ Template:CDD	File:Hexahedron.png (8) (4.4.4)				File:Bicolor cubic honeycomb.png	File:Cubic tiling.png	File:Cubic honeycomb verf.svg octahedron
J_12,32 A₁₅ W₁₄ G₇ t₁δ₄ O₁₅	Rectified cubic (rich) Template:CDD ↔ Template:CDD	File:Cuboctahedron.png (4) (3.4.3.4)		File:Uniform polyhedron-33-t1.svg (2) (3.3.3.3)		File:Rectified cubic honeycomb4.png	File:Rectified cubic tiling.png	File:Rectified alternate cubic honeycomb verf.png cuboid
J_12,32 A₁₅ W₁₄ G₇ t₁δ₄ O₁₅	Rectified cubic (rich) Template:CDD ↔ Template:CDD	File:Octahedron.png (2) (3.3.3.3)		File:Uniform polyhedron-33-t02.svg (4) (3.4.3.4)		File:Rectified cubic honeycomb3.png	File:Rectified cubic tiling.png	File:Cantellated alternate cubic honeycomb verf.png cuboid
J₁₃ A₁₄ W₁₅ G₈ t_0,1δ₄ O₁₄	Truncated cubic (tich) Template:CDD ↔ Template:CDD	File:Truncated hexahedron.png (4) (3.8.8)		File:Uniform polyhedron-33-t1.svg (1) (3.3.3.3)		File:Truncated cubic honeycomb2.png	File:Truncated cubic tiling.png	File:Bicantellated alternate cubic honeycomb verf.png square pyramid
J₁₄ A₁₇ W₁₂ G₉ t_0,2δ₄ O₁₇	Cantellated cubic (srich) Template:CDD ↔ Template:CDD	File:Small rhombicuboctahedron.png (2) (3.4.4.4)	File:Uniform polyhedron 222-t012.png (2) (4.4.4)	File:Uniform polyhedron-33-t02.svg (1) (3.4.3.4)		File:Cantellated cubic honeycomb.jpg	File:Cantellated cubic tiling.png	File:Runcicantellated alternate cubic honeycomb verf.png obilique triangular prism
J₁₆ A₃ W₂ G₂₈ t_0,2δ₄ O₁₆	Bitruncated cubic (batch) Template:CDD ↔ Template:CDD	File:Truncated octahedron.png (2) (4.6.6)		File:Uniform polyhedron-33-t012.png (2) (4.6.6)		File:Bitruncated cubic honeycomb3.png	File:Bitruncated cubic tiling.png	File:Cantitruncated alternate cubic honeycomb verf.png isosceles tetrahedron
J₁₇ A₁₈ W₁₃ G₂₅ t_0,1,2δ₄ O₁₈	Cantitruncated cubic (grich) Template:CDD ↔ Template:CDD	File:Great rhombicuboctahedron.png (2) (4.6.8)	File:Uniform polyhedron 222-t012.png (1) (4.4.4)	File:Uniform polyhedron-33-t012.png(1) (4.6.6)		File:Cantitruncated Cubic Honeycomb.svg	File:Cantitruncated cubic tiling.png	File:Omnitruncated alternated cubic honeycomb verf.png irregular tetrahedron
J_21,31,51 A₂ W₉ G₁ hδ₄ O₂₁	Alternated cubic (octet) Template:CDD ↔ Template:CDD	File:Tetrahedron.png (8) (3.3.3)			File:Octahedron.png (6) (3.3.3.3)	File:Tetrahedral-octahedral honeycomb2.png	File:Alternated cubic tiling.png	File:Alternated cubic honeycomb verf.svg cuboctahedron
J_22,34 A₂₁ W₁₇ G₁₀ h₂δ₄ O₂₅	Cantic cubic (tatoh) Template:CDD ↔ Template:CDD	File:Truncated tetrahedron.png (2) (3.6.6)		File:Cuboctahedron.png (1) (3.4.3.4)	File:Truncated octahedron.png (2) (4.6.6)	File:Truncated Alternated Cubic Honeycomb.svg	File:Truncated alternated cubic tiling.png	File:Truncated alternated cubic honeycomb verf.png rectangular pyramid
Nonuniform_a	Alternated bitruncated cubic (bisch) Template:CDD ↔ Template:CDD	File:Uniform polyhedron-43-h01.svg (2) (3.3.3.3.3)		File:Uniform polyhedron-33-s012.svg (2) (3.3.3.3.3)	File:Tetrahedron.png (4) (3.3.3)			File:Alternated bitruncated cubic honeycomb verf.png
Nonuniform_b	Alternated cantitruncated cubic (serch) Template:CDD ↔ Template:CDD	File:Snub hexahedron.png (2) (3.3.3.3.4)	File:Tetrahedron.png (1) (3.3.3)	File:Uniform polyhedron-43-h01.svg (1) (3.3.3.3.3)	File:Tetrahedron.png (4) (3.3.3)	File:Alternated cantitruncated cubic honeycomb.png		File:Alternated cantitruncated cubic honeycomb verf.png Irr. tridiminished icosahedron

Ã₃, [3^[4]] groupEdit

There are 5 forms<ref>[2], A000029 6-1 cases, skipping one with zero marks</ref> constructed from the <math>{\tilde{A}}_3</math>, [3^[4]] Coxeter group, of which only the quarter cubic honeycomb is unique. There is one index 2 subgroup [3^[4]]⁺ which generates the snub form, which is not uniform, but included for completeness.

Template:A3 honeycombs

Template:Brackets uniform honeycombs, space group FdTemplate:Overlinem (227)
Referenced indices	Honeycomb name Coxeter diagrams Template:CDD	Cells by location (and count around each vertex)		Solids (Partial)	Frames (Perspective)	vertex figure
Referenced indices	Honeycomb name Coxeter diagrams Template:CDD	(0,1) Template:CDD	(2,3) Template:CDD	Solids (Partial)	Frames (Perspective)	vertex figure
J_25,33 A₁₃ W₁₀ G₆ qδ₄ O₂₇	quarter cubic (cytatoh) Template:CDD ↔ Template:CDD q{4,3,4}	File:Tetrahedron.png (2) (3.3.3)	File:Truncated tetrahedron.png (6) (3.6.6)	File:Quarter cubic honeycomb.png	File:Bitruncated alternated cubic tiling.png	File:T01 quarter cubic honeycomb verf.png triangular antiprism

<[3^[4]]> ↔ [4,3^1,1] uniform honeycombs, space group FmTemplate:Overlinem (225)
Referenced indices	Honeycomb name Coxeter diagrams Template:CDD ↔ Template:CDD	Cells by location (and count around each vertex)			Solids (Partial)	Frames (Perspective)	vertex figure
Referenced indices	Honeycomb name Coxeter diagrams Template:CDD ↔ Template:CDD	0	(1,3)	2	Solids (Partial)	Frames (Perspective)	vertex figure
J_21,31,51 A₂ W₉ G₁ hδ₄ O₂₁	alternated cubic (octet) Template:CDD ↔ Template:CDD ↔ Template:CDD h{4,3,4}		File:Uniform polyhedron-33-t0.png (8) (3.3.3)	File:Uniform polyhedron-33-t1.svg (6) (3.3.3.3)	File:Tetrahedral-octahedral honeycomb2.png	File:Alternated cubic tiling.png	File:Alternated cubic honeycomb verf.svg cuboctahedron
J_22,34 A₂₁ W₁₇ G₁₀ h₂δ₄ O₂₅	cantic cubic (tatoh) Template:CDD ↔ Template:CDD ↔ Template:CDD h₂{4,3,4}	File:Truncated tetrahedron.png (2) (3.6.6)	File:Uniform polyhedron-33-t02.svg (1) (3.4.3.4)	File:Uniform polyhedron-33-t012.png (2) (4.6.6)	File:Truncated Alternated Cubic Honeycomb2.png	File:Truncated alternated cubic tiling.png	File:T012 quarter cubic honeycomb verf.png Rectangular pyramid

[2[3^[4]]] ↔ [4,3,4] uniform honeycombs, space group PmTemplate:Overlinem (221)
Referenced indices	Honeycomb name Coxeter diagrams Template:CDD ↔ Template:CDD	Cells by location (and count around each vertex)		Solids (Partial)	Frames (Perspective)	vertex figure
Referenced indices	Honeycomb name Coxeter diagrams Template:CDD ↔ Template:CDD	(0,2) Template:CDD	(1,3) Template:CDD	Solids (Partial)	Frames (Perspective)	vertex figure
J_12,32 A₁₅ W₁₄ G₇ t₁δ₄ O₁	rectified cubic (rich) Template:CDD ↔ Template:CDD ↔ Template:CDD ↔ Template:CDD r{4,3,4}	File:Uniform polyhedron-33-t02.svg (2) (3.4.3.4)	File:Uniform polyhedron-33-t1.svg (1) (3.3.3.3)	File:Rectified cubic honeycomb2.png	File:Rectified cubic tiling.png	File:T02 quarter cubic honeycomb verf.png cuboid

[4[3^[4]]] ↔ Template:Brackets uniform honeycombs, space group ImTemplate:Overlinem (229)
Referenced indices	Honeycomb name Coxeter diagrams Template:CDD ↔ Template:CDD ↔ Template:CDD	Cells by location (and count around each vertex)		Solids (Partial)	Frames (Perspective)	vertex figure
Referenced indices		(0,1,2,3) Template:CDD	Alt	Solids (Partial)	Frames (Perspective)	vertex figure
J₁₆ A₃ W₂ G₂₈ t_1,2δ₄ O₁₆	bitruncated cubic (batch) Template:CDD ↔ Template:CDD ↔ Template:CDD 2t{4,3,4}	File:Uniform polyhedron-33-t012.png (4) (4.6.6)		File:Bitruncated cubic honeycomb2.png	File:Bitruncated cubic tiling.png	File:T0123 quarter cubic honeycomb verf.png isosceles tetrahedron
Nonuniform_a	Alternated cantitruncated cubic (bisch) Template:CDD ↔ Template:CDD ↔ Template:CDD h2t{4,3,4}	File:Uniform polyhedron-33-s012.png (4) (3.3.3.3.3)	File:Uniform polyhedron-33-t0.png (4) (3.3.3)			File:Alternated bitruncated cubic honeycomb verf.png

Nonwythoffian forms (gyrated and elongated)Edit

Three more uniform honeycombs are generated by breaking one or another of the above honeycombs where its faces form a continuous plane, then rotating alternate layers by 60 or 90 degrees (gyration) and/or inserting a layer of prisms (elongation).

The elongated and gyroelongated alternated cubic tilings have the same vertex figure, but are not alike. In the elongated form, each prism meets a tetrahedron at one triangular end and an octahedron at the other. In the gyroelongated form, prisms that meet tetrahedra at both ends alternate with prisms that meet octahedra at both ends.

The gyroelongated triangular prismatic tiling has the same vertex figure as one of the plain prismatic tilings; the two may be derived from the gyrated and plain triangular prismatic tilings, respectively, by inserting layers of cubes.

Referenced indices	symbol	Honeycomb name	cell types (# at each vertex)	Solids (Partial)	Frames (Perspective)	vertex figure
J₅₂ A_2' G₂ O₂₂	h{4,3,4}:g	gyrated alternated cubic (gytoh)	tetrahedron (8) octahedron (6)	File:Gyrated alternated cubic honeycomb.png	File:Gyrated alternated cubic.png	File:Gyrated alternated cubic honeycomb verf.png triangular orthobicupola
J₆₁ A_? G₃ O₂₄	h{4,3,4}:ge	gyroelongated alternated cubic (gyetoh)	triangular prism (6) tetrahedron (4) octahedron (3)	File:Gyroelongated alternated cubic honeycomb.png	File:Gyroelongated alternated cubic tiling.png	File:Gyroelongated alternated cubic honeycomb verf.png
J₆₂ A_? G₄ O₂₃	h{4,3,4}:e	elongated alternated cubic (etoh)	triangular prism (6) tetrahedron (4) octahedron (3)	File:Elongated alternated cubic honeycomb.png	File:Elongated alternated cubic tiling.png	File:Gyroelongated alternated cubic honeycomb verf.png
J₆₃ A_? G₁₂ O₁₂	{3,6}:g × {∞}	gyrated triangular prismatic (gytoph)	triangular prism (12)	File:Gyrated triangular prismatic honeycomb.png	File:Gyrated triangular prismatic tiling.png	File:Gyrated triangular prismatic honeycomb verf.png
J₆₄ A_? G₁₅ O₁₃	{3,6}:ge × {∞}	gyroelongated triangular prismatic (gyetaph)	triangular prism (6) cube (4)	File:Gyroelongated triangular prismatic honeycomb.png	File:Gyroelongated triangular prismatic tiling.png	File:Gyroelongated alternated triangular prismatic honeycomb verf.png

Prismatic stacksEdit

Eleven prismatic tilings are obtained by stacking the eleven uniform plane tilings, shown below, in parallel layers. (One of these honeycombs is the cubic, shown above.) The vertex figure of each is an irregular bipyramid whose faces are isosceles triangles.

The C̃₂×Ĩ₁(∞), [4,4,2,∞], prismatic groupEdit

There are only 3 unique honeycombs from the square tiling, but all 6 tiling truncations are listed below for completeness, and tiling images are shown by colors corresponding to each form.

Indices	Coxeter-Dynkin and Schläfli symbols	Honeycomb name	Plane tiling	Solids (Partial)	Tiling
J_11,15 A₁ G₂₂	Template:CDD {4,4}×{∞}	Cubic (Square prismatic) (chon)	(4.4.4.4)	File:Partial cubic honeycomb.png	File:Uniform tiling 44-t0.svg
	Template:CDD r{4,4}×{∞}				File:Uniform tiling 44-t1.png
	Template:CDD rr{4,4}×{∞}				File:Uniform tiling 44-t02.svg
J₄₅ A₆ G₂₄	Template:CDD t{4,4}×{∞}	Truncated/Bitruncated square prismatic (tassiph)	(4.8.8)	File:Truncated square prismatic honeycomb.png	File:Uniform tiling 44-t01.png
J₄₅ A₆ G₂₄	Template:CDD tr{4,4}×{∞}	Truncated/Bitruncated square prismatic (tassiph)	(4.8.8)	File:Truncated square prismatic honeycomb.png	File:Uniform tiling 44-t012.png
J₄₄ A₁₁ G₁₄	Template:CDD sr{4,4}×{∞}	Snub square prismatic (sassiph)	(3.3.4.3.4)	File:Snub square prismatic honeycomb.png	File:Uniform tiling 44-snub.svg
Nonuniform	Template:CDD ht_0,1,2,3{4,4,2,∞}

The G̃₂xĨ₁(∞), [6,3,2,∞] prismatic groupEdit

Indices	Coxeter-Dynkin and Schläfli symbols	Honeycomb name	Plane tiling	Solids (Partial)	Tiling
J₄₁ A₄ G₁₁	Template:CDD {3,6} × {∞}	Triangular prismatic (tiph)	(3⁶)	File:Triangular prismatic honeycomb.png	File:Uniform tiling 63-t2-red.svg
J₄₂ A₅ G₂₆	Template:CDD {6,3} × {∞}	Hexagonal prismatic (hiph)	(6³)	File:Hexagonal prismatic honeycomb.png	File:Uniform tiling 63-t0.svg
J₄₂ A₅ G₂₆	Template:CDD t{3,6} × {∞}	Hexagonal prismatic (hiph)	(6³)	File:Truncated triangular prismatic honeycomb.png	File:Uniform tiling 63-t12.svg
J₄₃ A₈ G₁₈	Template:CDD r{6,3} × {∞}	Trihexagonal prismatic (thiph)	(3.6.3.6)	File:Triangular-hexagonal prismatic honeycomb.png	File:Uniform tiling 63-t1.png
J₄₆ A₇ G₁₉	Template:CDD t{6,3} × {∞}	Truncated hexagonal prismatic (thaph)	(3.12.12)	File:Truncated hexagonal prismatic honeycomb.png	File:Uniform tiling 63-t01.png
J₄₇ A₉ G₁₆	Template:CDD rr{6,3} × {∞}	Rhombi-trihexagonal prismatic (srothaph)	(3.4.6.4)	File:Rhombitriangular-hexagonal prismatic honeycomb.png	File:Uniform tiling 63-t02.png
J₄₈ A₁₂ G₁₇	Template:CDD sr{6,3} × {∞}	Snub hexagonal prismatic (snathaph)	(3.3.3.3.6)	File:Snub triangular-hexagonal prismatic honeycomb.png	File:Uniform tiling 63-snub.png
J₄₉ A₁₀ G₂₃	Template:CDD tr{6,3} × {∞}	truncated trihexagonal prismatic (grothaph)	(4.6.12)	File:Omnitruncated triangular-hexagonal prismatic honeycomb.png	File:Uniform tiling 63-t012.svg
J₆₅ A_11' G₁₃	Template:CDD {3,6}:e × {∞}	elongated triangular prismatic (etoph)	(3.3.3.4.4)	File:Elongated triangular prismatic honeycomb.png	File:Tile 33344.svg
J₅₂ A_2' G₂	Template:CDD h3t{3,6,2,∞}	gyrated tetrahedral-octahedral (gytoh)	(3⁶)	File:Gyrated alternated cubic honeycomb.png	File:Uniform tiling 63-t2-red.svg
J₅₂ A_2' G₂	Template:CDD s2r{3,6,2,∞}	gyrated tetrahedral-octahedral (gytoh)	(3⁶)	File:Gyrated alternated cubic honeycomb.png	File:Uniform tiling 63-t2-red.svg
Nonuniform	Template:CDD ht_0,1,2,3{3,6,2,∞}

Enumeration of Wythoff formsEdit

All nonprismatic Wythoff constructions by Coxeter groups are given below, along with their alternations. Uniform solutions are indexed with Branko Grünbaum's listing. Green backgrounds are shown on repeated honeycombs, with the relations are expressed in the extended symmetry diagrams.

Coxeter group	Extended symmetry	Honeycombs		Chiral extended symmetry	Alternation honeycombs
[4,3,4] Template:CDD	[4,3,4] Template:CDD	6	Template:CDD₂₂ \| Template:CDD₇ \| Template:CDD₈ Template:CDD₉ \| Template:CDD₂₅ \| Template:CDD₂₀	[1⁺,4,3⁺,4,1⁺]	(2)	Template:CDD₁ \| Template:CDD_b
	[2⁺[4,3,4]] Template:CDD = Template:CDD	(1)	Template:CDD ₂₂	[2⁺[(4,3⁺,4,2⁺)]]	(1)	Template:CDD₁ \| Template:CDD₆
	[2⁺[4,3,4]] Template:CDD	1	Template:CDD₂₈	[2⁺[(4,3⁺,4,2⁺)]]	(1)	Template:CDD_a
	[2⁺[4,3,4]] Template:CDD	2	Template:CDD₂₇	[2⁺[4,3,4]]⁺	(1)	Template:CDD_c
[4,3^1,1] Template:CDD	[4,3^1,1] Template:CDD	4	Template:CDD₁ \| Template:CDD₇ \| Template:CDD₁₀ \| Template:CDD₂₈
	[1[4,3^1,1]]=[4,3,4] Template:CDD = Template:CDD	(7)	Template:CDD₂₂ \| Template:CDD₇ \| Template:CDD₂₂ \| Template:CDD₇ \| Template:CDD₉ \| Template:CDD₂₈ \| Template:CDD₂₅	[1[1⁺,4,3^1,1]]⁺	(2)	Template:CDD₁ \| Template:CDD₆ \| Template:CDD_a
	[1[4,3^1,1]]=[4,3,4] Template:CDD = Template:CDD	(7)		[1[4,3^1,1]]⁺ =[4,3,4]⁺	(1)	Template:CDD_b
[3^[4]] Template:CDD	[3^[4]]	(none)
	[2⁺[3^[4]]] Template:CDD	1	Template:CDD₆
	[1[3^[4]]]=[4,3^1,1] Template:CDD = Template:CDD	(2)	Template:CDD₁ \| Template:CDD₁₀
	[2[3^[4]]]=[4,3,4] Template:CDD = Template:CDD	(1)	Template:CDD₇
	[(2⁺,4)[3^[4]]]=[2⁺[4,3,4]] Template:CDD = Template:CDD	(1)	Template:CDD₂₈	[(2⁺,4)[3^[4]]]⁺ = [2⁺[4,3,4]]⁺	(1)	Template:CDD_a

ExamplesEdit

The alternated cubic honeycomb is of special importance since its vertices form a cubic close-packing of spheres. The space-filling truss of packed octahedra and tetrahedra was apparently first discovered by Alexander Graham Bell and independently re-discovered by Buckminster Fuller (who called it the octet truss and patented it in the 1940s). [3] [4] [5] [6]. Octet trusses are now among the most common types of truss used in construction.

Frieze formsEdit

If cells are allowed to be uniform tilings, more uniform honeycombs can be defined:

Families:

<math>{\tilde{C}}_2</math>×<math>A_1</math>: [4,4,2] Template:CDD Cubic slab honeycombs (3 forms)
<math>{\tilde{G}}_2</math>×<math>A_1</math>: [6,3,2] Template:CDD Tri-hexagonal slab honeycombs (8 forms)
<math>{\tilde{A}}_2</math>×<math>A_1</math>: [(3,3,3),2] Template:CDD Triangular slab honeycombs (No new forms)
<math>{\tilde{I}}_1</math>×<math>A_1</math>×<math>A_1</math>: [∞,2,2] Template:CDD = Template:CDD Cubic column honeycombs (1 form)
<math>I_2(p)</math>×<math>{\tilde{I}}_1</math>: [p,2,∞] Template:CDD Polygonal column honeycombs (analogous to duoprisms: these look like a single infinite tower of p-gonal prisms, with the remaining space filled with apeirogonal prisms)
<math>{\tilde{I}}_1</math>×<math>{\tilde{I}}_1</math>×<math>A_1</math>: [∞,2,∞,2] = [4,4,2] - Template:CDD = Template:CDD (Same as cubic slab honeycomb family)

Examples (partially drawn)
Cubic slab honeycomb Template:CDD	Alternated hexagonal slab honeycomb Template:CDD	Trihexagonal slab honeycomb Template:CDD
File:Cubic semicheck.png	File:Tetroctahedric semicheck.png	File:Trihexagonal prism slab honeycomb.png
File:X4o4o2ox vertex figure.png (4) 4³: cube (1) 4⁴: square tiling	File:O6x3o2x vertex figure.png (4) 3³: tetrahedron (3) 3⁴: octahedron (1) 3⁶: triangular tiling	File:O3o6s2s vertex figure.png (2) 3.4.4: triangular prism (2) 4.4.6: hexagonal prism (1) (3.6)²: trihexagonal tiling

The first two forms shown above are semiregular (uniform with only regular facets), and were listed by Thorold Gosset in 1900 respectively as the 3-ic semi-check and tetroctahedric semi-check.<ref>Template:Cite journal</ref>

Scaliform honeycombEdit

A scaliform honeycomb is vertex-transitive, like a uniform honeycomb, with regular polygon faces while cells and higher elements are only required to be orbiforms, equilateral, with their vertices lying on hyperspheres. For 3D honeycombs, this allows a subset of Johnson solids along with the uniform polyhedra. Some scaliforms can be generated by an alternation process, leaving, for example, pyramid and cupola gaps.<ref>{{#invoke:citation/CS1|citation |CitationClass=web }}</ref>

Euclidean honeycomb scaliforms
Frieze slabs			Prismatic stacks
s₃{2,6,3}, Template:CDD	s₃{2,4,4}, Template:CDD	s{2,4,4}, Template:CDD	3s₄{4,4,2,∞}, Template:CDD
File:Runcic snub 263 honeycomb.png	File:Runcic snub 244 honeycomb.png	File:Alternated cubic slab honeycomb.png	File:Elongated square antiprismatic celluation.png
File:Triangular cupola.png File:Octahedron.png File:Uniform polyhedron-63-t1-1.svg	File:Square cupola.png File:Tetrahedron.png File:Uniform tiling 44-t01.png	File:Square pyramid.png File:Tetrahedron.png File:Uniform tiling 44-t0.svg	File:Square pyramid.png File:Tetrahedron.png File:Hexahedron.png
File:S2s6o3x vertex figure.png (1) 3.4.3.4: triangular cupola (2) 3.4.6: triangular cupola (1) 3.3.3.3: octahedron (1) 3.6.3.6: trihexagonal tiling	File:S2s4o4x vertex figure.png (1) 3.4.4.4: square cupola (2) 3.4.8: square cupola (1) 3.3.3: tetrahedron (1) 4.8.8: truncated square tiling	File:O4o4s2s vertex figure.png (1) 3.3.3.3: square pyramid (4) 3.3.4: square pyramid (4) 3.3.3: tetrahedron (1) 4.4.4.4: square tiling	File:O4o4s2six vertex figure.png (1) 3.3.3.3: square pyramid (4) 3.3.4: square pyramid (4) 3.3.3: tetrahedron (4) 4.4.4: cube

Hyperbolic formsEdit

File:Hyperbolic orthogonal dodecahedral honeycomb.png

The order-4 dodecahedral honeycomb, {5,3,4} in perspective

File:Hyperbolic 3d hexagonal tiling.png

The paracompact hexagonal tiling honeycomb, {6,3,3}, in perspective

{{#invoke:Labelled list hatnote|labelledList|Main article|Main articles|Main page|Main pages}}

There are 9 Coxeter group families of compact uniform honeycombs in hyperbolic 3-space, generated as Wythoff constructions, and represented by ring permutations of the Coxeter-Dynkin diagrams for each family.

From these 9 families, there are a total of 76 unique honeycombs generated:

[3,5,3] : Template:CDD - 9 forms
[5,3,4] : Template:CDD - 15 forms
[5,3,5] : Template:CDD - 9 forms
[5,3^1,1] : Template:CDD - 11 forms (7 overlap with [5,3,4] family, 4 are unique)
[(4,3,3,3)] : Template:CDD - 9 forms
[(4,3,4,3)] : Template:CDD - 6 forms
[(5,3,3,3)] : Template:CDD - 9 forms
[(5,3,4,3)] : Template:CDD - 9 forms
[(5,3,5,3)] : Template:CDD - 6 forms

Several non-Wythoffian forms outside the list of 76 are known; it is not known how many there are.

Paracompact hyperbolic formsEdit

{{#invoke:Labelled list hatnote|labelledList|Main article|Main articles|Main page|Main pages}} There are also 23 paracompact Coxeter groups of rank 4. These families can produce uniform honeycombs with unbounded facets or vertex figure, including ideal vertices at infinity:

Simplectic hyperbolic paracompact group summary
Type	Coxeter groups	Unique honeycomb count
Linear graphs	Template:CDD \| Template:CDD \| Template:CDD \| Template:CDD \| Template:CDD \| Template:CDD \| Template:CDD	4×15+6+8+8 = 82
Tridental graphs	Template:CDD \| Template:CDD \| Template:CDD	4+4+0 = 8
Cyclic graphs	Template:CDD \| Template:CDD \| Template:CDD \| Template:CDD \| Template:CDD \| Template:CDD \| Template:CDD \| Template:CDD \| Template:CDD	4×9+5+1+4+1+0 = 47
Loop-n-tail graphs	Template:CDD \| Template:CDD \| Template:CDD \| Template:CDD	4+4+4+2 = 14

ReferencesEdit

John H. Conway, Heidi Burgiel, Chaim Goodman-Strauss, (2008) The Symmetries of Things, Template:ISBN (Chapter 21, Naming the Archimedean and Catalan polyhedra and tilings, Architectonic and Catoptric tessellations, p 292–298, includes all the nonprismatic forms)
Branko Grünbaum, (1994) Uniform tilings of 3-space. Geombinatorics 4, 49 - 56.
Norman Johnson (1991) Uniform Polytopes, Manuscript
Template:The Geometrical Foundation of Natural Structure (book) (Chapter 5: Polyhedra packing and space filling)
Template:Cite book
Kaleidoscopes: Selected Writings of H.S.M. Coxeter, edited by F. Arthur Sherk, Peter McMullen, Anthony C. Thompson, Asia Ivic Weiss, Wiley-Interscience Publication, 1995, Template:ISBN [7]
- (Paper 22) H.S.M. Coxeter, Regular and Semi Regular Polytopes I, [Math. Zeit. 46 (1940) 380–407, MR 2,10] (1.9 Uniform space-fillings)
A. Andreini, (1905) Sulle reti di poliedri regolari e semiregolari e sulle corrispondenti reti correlative (On the regular and semiregular nets of polyhedra and on the corresponding correlative nets), Mem. Società Italiana della Scienze, Ser.3, 14 75–129. PDF [8]
D. M. Y. Sommerville, (1930) An Introduction to the Geometry of n Dimensions. New York, E. P. Dutton, . 196 pp. (Dover Publications edition, 1958) Chapter X: The Regular Polytopes
Template:Cite book Chapter 5. Joining polyhedra
Crystallography of Quasicrystals: Concepts, Methods and Structures by Walter Steurer, Sofia Deloudi (2009), p. 54-55. 12 packings of 2 or more uniform polyhedra with cubic symmetry

External linksEdit

Template:Sister project

Template:Mathworld
Uniform Honeycombs in 3-Space VRML models
Elementary Honeycombs Vertex transitive space filling honeycombs with non-uniform cells.
Uniform partitions of 3-space, their relatives and embedding, 1999
The Uniform Polyhedra
Virtual Reality Polyhedra The Encyclopedia of Polyhedra
octet truss animation
Review: A. F. Wells, Three-dimensional nets and polyhedra, H. S. M. Coxeter (Source: Bull. Amer. Math. Soc. Volume 84, Number 3 (1978), 466-470.)
Template:KlitzingPolytopes
(sequence A242941 in the OEIS)

Template:Honeycombs