Paracompact uniform honeycombs

In geometry, uniform honeycombs in hyperbolic space are tessellations of convex uniform polyhedron cells. In 3-dimensional hyperbolic space there are 23 Coxeter group families of paracompact uniform honeycombs, generated as Wythoff constructions, and represented by ring permutations of the Coxeter diagrams for each family. These families can produce uniform honeycombs with infinite or unbounded facets or vertex figure, including ideal vertices at infinity, similar to the hyperbolic uniform tilings in 2-dimensions.

Example paracompact regular honeycombs
{3,3,6}	{6,3,3}	{4,3,6}	{6,3,4}
{5,3,6}	{6,3,5}	{6,3,6}	{3,6,3}
{4,4,3}	{3,4,4}	{4,4,4}

Name	Schläfli Symbol {p,q,r}	Cell type {p,q}	Face type {p}	Edge figure {r}	Vertex figure {q,r}	Dual	Coxeter group
Order-6 tetrahedral honeycomb	{3,3,6}	{3,3}	{3}	{6}	{3,6}	{6,3,3}	[6,3,3]
Hexagonal tiling honeycomb	{6,3,3}	{6,3}	{6}	{3}	{3,3}	{3,3,6}	[6,3,3]
Order-4 octahedral honeycomb	{3,4,4}	{3,4}	{3}	{4}	{4,4}	{4,4,3}	[4,4,3]
Square tiling honeycomb	{4,4,3}	{4,4}	{4}	{3}	{4,3}	{3,4,4}	[4,4,3]
Triangular tiling honeycomb	{3,6,3}	{3,6}	{3}	{3}	{6,3}	Self-dual	[3,6,3]
Order-6 cubic honeycomb	{4,3,6}	{4,3}	{4}	{4}	{3,6}	{6,3,4}	[6,3,4]
Order-4 hexagonal tiling honeycomb	{6,3,4}	{6,3}	{6}	{4}	{3,4}	{4,3,6}	[6,3,4]
Order-4 square tiling honeycomb	{4,4,4}	{4,4}	{4}	{4}	{4,4}	Self-dual	[4,4,4]
Order-6 dodecahedral honeycomb	{5,3,6}	{5,3}	{5}	{5}	{3,6}	{6,3,5}	[6,3,5]
Order-5 hexagonal tiling honeycomb	{6,3,5}	{6,3}	{6}	{5}	{3,5}	{5,3,6}	[6,3,5]
Order-6 hexagonal tiling honeycomb	{6,3,6}	{6,3}	{6}	{6}	{3,6}	Self-dual	[6,3,6]

Coxeter group	Simplex volume	Commutator subgroup	Unique honeycomb count
[6,3,3]	0.0422892336	[1⁺,6,(3,3)⁺] = [3,3^[3]]⁺	15
[4,4,3]	0.0763304662	[1⁺,4,1⁺,4,3⁺]	15
[3,3^[3]]	0.0845784672	[3,3^[3]]⁺	4
[6,3,4]	0.1057230840	[1⁺,6,3⁺,4,1⁺] = [3^[]x[]]⁺	15
[3,4^1,1]	0.1526609324	[3⁺,4^1⁺,1⁺]	4
[3,6,3]	0.1691569344	[3⁺,6,3⁺]	8
[6,3,5]	0.1715016613	[1⁺,6,(3,5)⁺] = [5,3^[3]]⁺	15
[6,3^1,1]	0.2114461680	[1⁺,6,(3^1,1)⁺] = [3^[]x[]]⁺	4
[4,3^[3]]	0.2114461680	[1⁺,4,3^[3]]⁺ = [3^[]x[]]⁺	4
[4,4,4]	0.2289913985	[4⁺,4⁺,4⁺]⁺	6
[6,3,6]	0.2537354016	[1⁺,6,3⁺,6,1⁺] = [3^[3,3]]⁺	8
[(4,4,3,3)]	0.3053218647	[(4,1⁺,4,(3,3)⁺)]	4
[5,3^[3]]	0.3430033226	[5,3^[3]]⁺	4
[(6,3,3,3)]	0.3641071004	[(6,3,3,3)]⁺	9
[3^[]x[]]	0.4228923360	[3^[]x[]]⁺	1
[4^1,1,1]	0.4579827971	[1⁺,4^{1⁺,1⁺,1⁺}]	0
[6,3^[3]]	0.5074708032	[1⁺,6,3^[3]] = [3^[3,3]]⁺	2
[(6,3,4,3)]	0.5258402692	[(6,3⁺,4,3⁺)]	9
[(4,4,4,3)]	0.5562821156	[(4,1⁺,4,1⁺,4,3⁺)]	9
[(6,3,5,3)]	0.6729858045	[(6,3,5,3)]⁺	9
[(6,3,6,3)]	0.8457846720	[(6,3⁺,6,3⁺)]	5
[(4,4,4,4)]	0.9159655942	[(4⁺,4⁺,4⁺,4⁺)]	1
[3^[3,3]]	1.014916064	[3^[3,3]]⁺	0

#	Honeycomb name Coxeter diagram: Schläfli symbol	Cells by location (and count around each vertex)				Vertex figure	Picture
#	Honeycomb name Coxeter diagram: Schläfli symbol	1	2	3	4	Vertex figure	Picture
1	hexagonal (hexah) {6,3,3}	-	-	-	(4) (6.6.6)	Tetrahedron
2	rectified hexagonal (rihexah) t₁{6,3,3} or r{6,3,3}	(2) (3.3.3)	-	-	(3) (3.6.3.6)	Triangular prism
3	rectified order-6 tetrahedral (rath) t₁{3,3,6} or r{3,3,6}	(6) (3.3.3.3)	-	-	(2) (3.3.3.3.3.3)	Hexagonal prism
4	order-6 tetrahedral (thon) {3,3,6}	(∞) (3.3.3)	-	-	-	Triangular tiling
5	truncated hexagonal (thexah) t_0,1{6,3,3} or t{6,3,3}	(1) (3.3.3)	-	-	(3) (3.12.12)	Triangular pyramid
6	cantellated hexagonal (srihexah) t_0,2{6,3,3} or rr{6,3,3}	(1) 3.3.3.3	(2) (4.4.3)	-	(2) (3.4.6.4)
7	runcinated hexagonal (sidpithexah) t_0,3{6,3,3}	(1) (3.3.3)	(3) (4.4.3)	(3) (4.4.6)	(1) (6.6.6)
8	cantellated order-6 tetrahedral (srath) t_0,2{3,3,6} or rr{3,3,6}	(1) (3.4.3.4)	-	(2) (4.4.6)	(2) (3.6.3.6)
9	bitruncated hexagonal (tehexah) t_1,2{6,3,3} or 2t{6,3,3}	(2) (3.6.6)	-	-	(2) (6.6.6)
10	truncated order-6 tetrahedral (tath) t_0,1{3,3,6} or t{3,3,6}	(6) (3.6.6)	-	-	(1) (3.3.3.3.3.3)
11	cantitruncated hexagonal (grihexah) t_0,1,2{6,3,3} or tr{6,3,3}	(1) (3.6.6)	(1) (4.4.3)	-	(2) (4.6.12)
12	runcitruncated hexagonal (prath) t_0,1,3{6,3,3}	(1) (3.4.3.4)	(2) (4.4.3)	(1) (4.4.12)	(1) (3.12.12)
13	runcitruncated order-6 tetrahedral (prihexah) t_0,1,3{3,3,6}	(1) (3.6.6)	(1) (4.4.6)	(2) (4.4.6)	(1) (3.4.6.4)
14	cantitruncated order-6 tetrahedral (grath) t_0,1,2{3,3,6} or tr{3,3,6}	(2) (4.6.6)	-	(1) (4.4.6)	(1) (6.6.6)
15	omnitruncated hexagonal (gidpithexah) t_0,1,2,3{6,3,3}	(1) (4.6.6)	(1) (4.4.6)	(1) (4.4.12)	(1) (4.6.12)

#	Honeycomb name Coxeter diagram: Schläfli symbol	Cells by location (and count around each vertex)					Vertex figure	Picture
#	Honeycomb name Coxeter diagram: Schläfli symbol	1	2	3	4	Alt	Vertex figure	Picture
[137]	alternated hexagonal (ahexah) ( ↔ ) =	-	-		(4) (3.3.3.3.3.3)	(4) (3.3.3)	(3.6.6)
[138]	cantic hexagonal (tahexah) ↔	(1) (3.3.3.3)	-		(2) (3.6.3.6)	(2) (3.6.6)
[139]	runcic hexagonal (birahexah) ↔	(1) (4.4.4)	(1) (4.4.3)		(1) (3.3.3.3.3.3)	(3) (3.4.3.4)
[140]	runcicantic hexagonal (bitahexah) ↔	(1) (3.6.6)	(1) (4.4.3)		(1) (3.6.3.6)	(2) (4.6.6)
Nonuniform	snub rectified order-6 tetrahedral ↔ sr{3,3,6}					Irr. (3.3.3)
Nonuniform	cantic snub order-6 tetrahedral sr₃{3,3,6}
Nonuniform	omnisnub order-6 tetrahedral ht_0,1,2,3{6,3,3}					Irr. (3.3.3)

#	Name of honeycomb Coxeter diagram Schläfli symbol	Cells by location and count per vertex				Vertex figure	Picture
#	Name of honeycomb Coxeter diagram Schläfli symbol	0	1	2	3	Vertex figure	Picture
16	(Regular) order-4 hexagonal (shexah) {6,3,4}	-	-	-	(8) (6.6.6)	(3.3.3.3)
17	rectified order-4 hexagonal (rishexah) t₁{6,3,4} or r{6,3,4}	(2) (3.3.3.3)	-	-	(4) (3.6.3.6)	(4.4.4)
18	rectified order-6 cubic (rihach) t₁{4,3,6} or r{4,3,6}	(6) (3.4.3.4)	-	-	(2) (3.3.3.3.3.3)	(6.4.4)
19	order-6 cubic (hachon) {4,3,6}	(20) (4.4.4)	-	-	-	(3.3.3.3.3.3)
20	truncated order-4 hexagonal (tishexah) t_0,1{6,3,4} or t{6,3,4}	(1) (3.3.3.3)	-	-	(4) (3.12.12)
21	bitruncated order-6 cubic (chexah) t_1,2{6,3,4} or 2t{6,3,4}	(2) (4.6.6)	-	-	(2) (6.6.6)
22	truncated order-6 cubic (thach) t_0,1{4,3,6} or t{4,3,6}	(6) (3.8.8)	-	-	(1) (3.3.3.3.3.3)
23	cantellated order-4 hexagonal (srishexah) t_0,2{6,3,4} or rr{6,3,4}	(1) (3.4.3.4)	(2) (4.4.4)	-	(2) (3.4.6.4)
24	cantellated order-6 cubic (srihach) t_0,2{4,3,6} or rr{4,3,6}	(2) (3.4.4.4)	-	(2) (4.4.6)	(1) (3.6.3.6)
25	runcinated order-6 cubic (sidpichexah) t_0,3{6,3,4}	(1) (4.4.4)	(3) (4.4.4)	(3) (4.4.6)	(1) (6.6.6)
26	cantitruncated order-4 hexagonal (grishexah) t_0,1,2{6,3,4} or tr{6,3,4}	(1) (4.6.6)	(1) (4.4.4)	-	(2) (4.6.12)
27	cantitruncated order-6 cubic (grihach) t_0,1,2{4,3,6} or tr{4,3,6}	(2) (4.6.8)	-	(1) (4.4.6)	(1) (6.6.6)
28	runcitruncated order-4 hexagonal (prihach) t_0,1,3{6,3,4}	(1) (3.4.4.4)	(1) (4.4.4)	(2) (4.4.12)	(1) (3.12.12)
29	runcitruncated order-6 cubic (prishexah) t_0,1,3{4,3,6}	(1) (3.8.8)	(2) (4.4.8)	(1) (4.4.6)	(1) (3.4.6.4)
30	omnitruncated order-6 cubic (gidpichexah) t_0,1,2,3{6,3,4}	(1) (4.6.8)	(1) (4.4.8)	(1) (4.4.12)	(1) (4.6.12)

Paracompact uniform honeycombs

Regular paracompact honeycombs

Coxeter groups of paracompact uniform honeycombs

Linear graphs

[6,3,3] family

[6,3,4] family

[6,3,5] family

[6,3,6] family

[3,6,3] family

[4,4,3] family

[4,4,4] family

Tridental graphs

[3,4^1,1] family

[4,4^1,1] family

[6,3^1,1] family

Cyclic graphs

[(4,4,3,3)] family

[(4,4,4,3)] family

[(4,4,4,4)] family

[(6,3,3,3)] family

[(6,3,4,3)] family

[(6,3,5,3)] family

[(6,3,6,3)] family

Loop-n-tail graphs

[3,3^[3]] family

[4,3^[3]] family

[5,3^[3]] family

[6,3^[3]] family

Multicyclic graphs

[3^{[ ]×[ ]}] family

[3^[3,3]] family

Summary enumerations by family

Linear graphs

Tridental graphs

Cyclic graphs

Loop-n-tail graphs

See also

Notes

References

Wikiwand - on


These graphs show subgroup relations of paracompact hyperbolic Coxeter groups. Order 2 subgroups represent bisecting a Goursat tetrahedron with a plane of mirror symmetry.

#	Honeycomb name Coxeter diagram	Cells by location				Vertex figure	Picture
#	Honeycomb name Coxeter diagram	0	1	2	3	Vertex figure	Picture
91	tetrahedral-square	-	(6) (444)	(8) (333)	(12) (3434)	(3444)
92	cyclotruncated square-tetrahedral	(444)	(488)	(333)	(388)
93	cyclotruncated tetrahedral-square	(1) (3333)	(1) (444)	(4) (366)	(4) (466)
94	truncated tetrahedral-square	(1) (3444)	(1) (488)	(1) (366)	(2) (468)
[64]	( ↔ ) = rectified order-4 octahedral (rocth)	(3434)	(4444)	(3434)	(3434)
[65]	( ↔ ) = order-4 octahedral (octh)	(3333)	-	(3333)	(3333)
[67]	( ↔ ) = truncated order-4 octahedral (tocth)	(466)	(4444)	(3434)	(466)
[83]	alternated square ( ↔ ) =	(444)	(4444)	-	(444)	(4.3.4.3)
[84]	cantic square ( ↔ ) =	(388)	(488)	(3434)	(388)
[85]	runcic square ( ↔ ) =	(3444)	(3434)	(3333)	(3444)
[86]	runcicantic square ( ↔ ) =	(468)	(488)	(466)	(468)

Regular paracompact honeycombs

Coxeter groups of paracompact uniform honeycombs

Linear graphs

[6,3,3] family

[6,3,4] family

[6,3,5] family

[6,3,6] family

[3,6,3] family

[4,4,3] family

[4,4,4] family

Tridental graphs

[3,41,1] family

[4,41,1] family

[6,31,1] family

Cyclic graphs

[(4,4,3,3)] family

[(4,4,4,3)] family

[(4,4,4,4)] family

[(6,3,3,3)] family

[(6,3,4,3)] family

[(6,3,5,3)] family

[(6,3,6,3)] family

Loop-n-tail graphs

[3,3[3]] family

[4,3[3]] family

[5,3[3]] family

[6,3[3]] family

Multicyclic graphs

[3[ ]×[ ]] family

[3[3,3]] family

Summary enumerations by family

Linear graphs

Tridental graphs

Cyclic graphs

Loop-n-tail graphs

See also

Notes

References

[3,4^1,1] family

[4,4^1,1] family

[6,3^1,1] family

[3,3^[3]] family

[4,3^[3]] family

[5,3^[3]] family

[6,3^[3]] family

[3^{[ ]×[ ]}] family

[3^[3,3]] family