16-cell honeycomb

16-cell honeycomb
File:Demitesseractic tetra hc.png Perspective projection: the first layer of adjacent 16-cell facets.
Type	Regular 4-honeycomb Uniform 4-honeycomb
Family	Alternated hypercube honeycomb
Schläfli symbol	{3,3,4,3}
Coxeter diagrams	File:CDel node 1.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 4.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.png File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 4.pngFile:CDel node.png = File:CDel node h1.pngFile:CDel 4.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 4.pngFile:CDel node.png File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png = File:CDel node h1.pngFile:CDel 4.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png File:CDel label2.pngFile:CDel branch hh.pngFile:CDel 4a4b.pngFile:CDel nodes.pngFile:CDel split2.pngFile:CDel node.png
4-face type	{3,3,4} File:Schlegel wireframe 16-cell.png
Cell type	{3,3} File:Tetrahedron.png
Face type	{3}
Edge figure	cube
Vertex figure	File:24-cell t0 F4.svg 24-cell
Coxeter group	${\tilde{F}}_{4}$ = [3,3,4,3]
Dual	{3,4,3,3}
Properties	vertex-transitive, edge-transitive, face-transitive, cell-transitive, 4-face-transitive

In four-dimensional Euclidean geometry, the 16-cell honeycomb is one of the three regular space-filling tessellations (or honeycombs), represented by Schläfli symbol {3,3,4,3}, and constructed by a 4-dimensional packing of 16-cell facets, three around every face. Its dual is the 24-cell honeycomb. Its vertex figure is a 24-cell. The vertex arrangement is called the B₄, D₄, or F₄ lattice.^[1]^[2]

Alternate names

Hexadecachoric tetracomb/honeycomb
Demitesseractic tetracomb/honeycomb

Coordinates

Vertices can be placed at all integer coordinates (i,j,k,l), such that the sum of the coordinates is even.

D₄ lattice

The vertex arrangement of the 16-cell honeycomb is called the D₄ lattice or F₄ lattice.^[2] The vertices of this lattice are the centers of the 3-spheres in the densest known packing of equal spheres in 4-space;^[3] its kissing number is 24, which is also the same as the kissing number in R⁴, as proved by Oleg Musin in 2003.^[4]^[5] The related D⁺
₄ lattice (also called D²
₄) can be constructed by the union of two D₄ lattices, and is identical to the C₄ lattice:^[6]

File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png ∪ File:CDel nodes 01rd.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png = File:CDel node 1.pngFile:CDel 4.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png = File:CDel node 1.pngFile:CDel 4.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 4.pngFile:CDel node.png

The kissing number for D⁺
₄ is 2³ = 8, (2^{n – 1} for n < 8, 240 for n = 8, and 2n(n – 1) for n > 8).^[7] The related D^*
₄ lattice (also called D⁴
₄ and C²
₄) can be constructed by the union of all four D₄ lattices, but it is identical to the D₄ lattice: It is also the 4-dimensional body centered cubic, the union of two 4-cube honeycombs in dual positions.^[8]

File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png ∪ File:CDel nodes 01rd.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png ∪ File:CDel nodes.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes 10lu.png ∪ File:CDel nodes.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes 01ld.png = File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png = File:CDel nodes 10r.pngFile:CDel 4a4b.pngFile:CDel nodes.pngFile:CDel split2.pngFile:CDel node.png ∪ File:CDel nodes 01r.pngFile:CDel 4a4b.pngFile:CDel nodes.pngFile:CDel split2.pngFile:CDel node.png.

The kissing number of the D^*
₄ lattice (and D₄ lattice) is 24^[9] and its Voronoi tessellation is a 24-cell honeycomb, File:CDel node 1.pngFile:CDel split1.pngFile:CDel nodes.pngFile:CDel 4a4b.pngFile:CDel nodes.png, containing all rectified 16-cells (24-cell) Voronoi cells, File:CDel node.pngFile:CDel 4.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node.png or File:CDel node 1.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 4.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.png.^[10]

Symmetry constructions

There are three different symmetry constructions of this tessellation. Each symmetry can be represented by different arrangements of colored 16-cell facets.

Coxeter group	Schläfli symbol	Coxeter diagram	Vertex figure Symmetry	Facets/verf
${\tilde{F}}_{4}$ = [3,3,4,3]	{3,3,4,3}	File:CDel node 1.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 4.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.png	File:CDel node 1.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 4.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.png [3,4,3], order 1152	24: 16-cell
${\tilde{B}}_{4}$ = [3^1,1,3,4]	= h{4,3,3,4}	File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 4.pngFile:CDel node.png = File:CDel node h1.pngFile:CDel 4.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 4.pngFile:CDel node.png	File:CDel node.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel 4.pngFile:CDel node.png [3,3,4], order 384	16+8: 16-cell
${\tilde{D}}_{4}$ = [3^1,1,1,1]	{3,3^1,1,1} = h{4,3,3^1,1}	File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png = File:CDel node h1.pngFile:CDel 4.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png	File:CDel node.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel split1.pngFile:CDel nodes.png [3^1,1,1], order 192	8+8+8: 16-cell
2×½ ${\tilde{C}}_{4}$ = [[(4,3,3,4,2⁺)]]	ht_0,4{4,3,3,4}	File:CDel label2.pngFile:CDel branch hh.pngFile:CDel 4a4b.pngFile:CDel nodes.pngFile:CDel split2.pngFile:CDel node.png		8+4+4: 4-demicube 8: 16-cell

Related honeycombs

It is related to the regular hyperbolic 5-space 5-orthoplex honeycomb, {3,3,3,4,3}, with 5-orthoplex facets, the regular 4-polytope 24-cell, {3,4,3} with octahedral (3-orthoplex) cell, and cube {4,3}, with (2-orthoplex) square faces. It has a 2-dimensional analogue, {3,6}, and as an alternated form (the demitesseractic honeycomb, h{4,3,3,4}) it is related to the alternated cubic honeycomb. This honeycomb is one of 20 uniform honeycombs constructed by the ${\tilde{D}}_{5}$ Coxeter group, all but 3 repeated in other families by extended symmetry, seen in the graph symmetry of rings in the Coxeter–Dynkin diagrams. The 20 permutations are listed with its highest extended symmetry relation:

D5 honeycombs
Extended symmetry	Extended diagram	Extended group	Honeycombs
[3^1,1,3,3^1,1]	File:CDel nodes.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png	${\tilde{D}}_{5}$	File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes 10lu.png
<[3^1,1,3,3^1,1]> ↔ [3^1,1,3,3,4]	File:CDel nodeab c1-2.pngFile:CDel split2.pngFile:CDel node c3.pngFile:CDel 3.pngFile:CDel node c4.pngFile:CDel split1.pngFile:CDel nodeab c5.png ↔ File:CDel nodeab c1-2.pngFile:CDel split2.pngFile:CDel node c3.pngFile:CDel 3.pngFile:CDel node c4.pngFile:CDel 3.pngFile:CDel node c5.pngFile:CDel 4.pngFile:CDel node.png	${\tilde{D}}_{5}$ ×2₁ = ${\tilde{B}}_{5}$	File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel split1.pngFile:CDel nodes 11.png, File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel split1.pngFile:CDel nodes 11.png, File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png, File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel split1.pngFile:CDel nodes.png, File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel split1.pngFile:CDel nodes.png, File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes 11.png, File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes 11.png
[[3^1,1,3,3^1,1]]	File:CDel nodeab c1-2.pngFile:CDel split2.pngFile:CDel node c3.pngFile:CDel 3.pngFile:CDel node c3.pngFile:CDel split1.pngFile:CDel nodeab c1-2.png	${\tilde{D}}_{5}$ ×2₂	File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes 10lu.png, File:CDel nodes 10ru.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel split1.pngFile:CDel nodes 10lu.png
<2[3^1,1,3,3^1,1]> ↔ [4,3,3,3,4]	File:CDel nodeab c1.pngFile:CDel split2.pngFile:CDel node c3.pngFile:CDel 3.pngFile:CDel node c2.pngFile:CDel split1.pngFile:CDel nodeab c4.png ↔ File:CDel node.pngFile:CDel 4.pngFile:CDel node c1.pngFile:CDel 3.pngFile:CDel node c3.pngFile:CDel 3.pngFile:CDel node c2.pngFile:CDel 3.pngFile:CDel node c4.pngFile:CDel 4.pngFile:CDel node.png	${\tilde{D}}_{5}$ ×4₁ = ${\tilde{C}}_{5}$	File:CDel nodes 11.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png, File:CDel nodes.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png, File:CDel nodes 11.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes.png, File:CDel nodes 11.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel split1.pngFile:CDel nodes.png, File:CDel nodes 11.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel split1.pngFile:CDel nodes.png, File:CDel nodes 11.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes 11.png
[<2[3^1,1,3,3^1,1]>] ↔ [[4,3,3,3,4]]	File:CDel nodeab c1.pngFile:CDel split2.pngFile:CDel node c2.pngFile:CDel 3.pngFile:CDel node c2.pngFile:CDel split1.pngFile:CDel nodeab c1.png ↔ File:CDel node.pngFile:CDel 4.pngFile:CDel node c1.pngFile:CDel 3.pngFile:CDel node c2.pngFile:CDel 3.pngFile:CDel node c2.pngFile:CDel 3.pngFile:CDel node c1.pngFile:CDel 4.pngFile:CDel node.png	${\tilde{D}}_{5}$ ×8 = ${\tilde{C}}_{5}$ ×2	File:CDel nodes.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel split1.pngFile:CDel nodes.png, File:CDel nodes 11.pngFile:CDel split2.pngFile:CDel node.pngFile:CDel 3.pngFile:CDel node.pngFile:CDel split1.pngFile:CDel nodes 11.png, File:CDel nodes 11.pngFile:CDel split2.pngFile:CDel node 1.pngFile:CDel 3.pngFile:CDel node 1.pngFile:CDel split1.pngFile:CDel nodes 11.png

Notes

↑ "The Lattice F4".
↑ ^2.0 ^2.1 "The Lattice D4".
↑ Conway and Sloane, Sphere packings, lattices, and groups, 1.4 n-dimensional packings, p.9
↑ Conway and Sloane, Sphere packings, lattices, and groups, 1.5 Sphere packing problem summary of results, p. 12
↑ O. R. Musin (2003). "The problem of the twenty-five spheres". Russ. Math. Surv. 58 (4): 794–795. Bibcode:2003RuMaS..58..794M. doi:10.1070/RM2003v058n04ABEH000651.
↑ Conway and Sloane, Sphere packings, lattices, and groups, 7.3 The packing D₃⁺, p.119
↑ Conway and Sloane, Sphere packings, lattices, and groups, p. 119
↑ Conway and Sloane, Sphere packings, lattices, and groups, 7.4 The dual lattice D₃^*, p.120
↑ Conway and Sloane, Sphere packings, lattices, and groups, p. 120
↑ Conway and Sloane, Sphere packings, lattices, and groups, p. 466

References

Coxeter, H.S.M. Regular Polytopes, (3rd edition, 1973), Dover edition, ISBN 0-486-61480-8
- pp. 154–156: Partial truncation or alternation, represented by h prefix: h{4,4} = {4,4}; h{4,3,4} = {3^1,1,4}, h{4,3,3,4} = {3,3,4,3}, ...
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, ISBN 978-0-471-01003-6 [1]
- (Paper 24) H.S.M. Coxeter, Regular and Semi-Regular Polytopes III, [Math. Zeit. 200 (1988) 3-45]
George Olshevsky, Uniform Panoploid Tetracombs, Manuscript (2006) (Complete list of 11 convex uniform tilings, 28 convex uniform honeycombs, and 143 convex uniform tetracombs)
Klitzing, Richard. "4D Euclidean tesselations". x3o3o4o3o - hext - O104
Conway JH, Sloane NJH (1998). Sphere Packings, Lattices and Groups (3rd ed.). ISBN 0-387-98585-9.

v t e Fundamental convex regular and uniform honeycombs in dimensions 2–9
Space	Family	${\tilde{A}}_{n - 1}$	${\tilde{C}}_{n - 1}$	${\tilde{B}}_{n - 1}$	${\tilde{D}}_{n - 1}$	${\tilde{G}}_{2}$ / ${\tilde{F}}_{4}$ / ${\tilde{E}}_{n - 1}$
E²	Uniform tiling	0_[3]	δ₃	hδ₃	qδ₃	Hexagonal
E³	Uniform convex honeycomb	0_[4]	δ₄	hδ₄	qδ₄
E⁴	Uniform 4-honeycomb	0_[5]	δ₅	hδ₅	qδ₅	24-cell honeycomb
E⁵	Uniform 5-honeycomb	0_[6]	δ₆	hδ₆	qδ₆
E⁶	Uniform 6-honeycomb	0_[7]	δ₇	hδ₇	qδ₇	2₂₂
E⁷	Uniform 7-honeycomb	0_[8]	δ₈	hδ₈	qδ₈	1₃₃ • 3₃₁
E⁸	Uniform 8-honeycomb	0_[9]	δ₉	hδ₉	qδ₉	1₅₂ • 2₅₁ • 5₂₁
E⁹	Uniform 9-honeycomb	0_[10]	δ₁₀	hδ₁₀	qδ₁₀
E¹⁰	Uniform 10-honeycomb	0_[11]	δ₁₁	hδ₁₁	qδ₁₁
E^n-1	Uniform (n-1)-honeycomb	0_[n]	δ_n	hδ_n	qδ_n	1_k2 • 2_k1 • k₂₁

[1] "The Lattice F4".

[www2.research.att.com-2] 2.0 ^2.1 "The Lattice D4".

[3] Conway and Sloane, Sphere packings, lattices, and groups, 1.4 n-dimensional packings, p.9

[4] Conway and Sloane, Sphere packings, lattices, and groups, 1.5 Sphere packing problem summary of results, p. 12

[Musin-5] O. R. Musin (2003). "The problem of the twenty-five spheres". Russ. Math. Surv. 58 (4): 794–795. Bibcode:2003RuMaS..58..794M. doi:10.1070/RM2003v058n04ABEH000651.

[6] Conway and Sloane, Sphere packings, lattices, and groups, 7.3 The packing D₃⁺, p.119

[7] Conway and Sloane, Sphere packings, lattices, and groups, p. 119

[8] Conway and Sloane, Sphere packings, lattices, and groups, 7.4 The dual lattice D₃^*, p.120

[9] Conway and Sloane, Sphere packings, lattices, and groups, p. 120

[10] Conway and Sloane, Sphere packings, lattices, and groups, p. 466

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16-cell honeycomb

Contents

Alternate names

Coordinates

D₄ lattice

Symmetry constructions

Related honeycombs

See also

Notes

References

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16-cell honeycomb

Alternate names

Coordinates

D4 lattice

Symmetry constructions

Related honeycombs

See also

Notes

References

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D₄ lattice