Hypercubic honeycomb

Hypercubic honeycomb: A regular square tiling.

A partial-filled cubic honeycomb in its regular form.

A checkboard square tiling

A partially-filled cubic honeycomb checkerboard.

An expanded square tiling

Expanded cubic honeycomb

In geometry, a hypercubic honeycomb is a family of regular honeycombs (tessellations) in n-dimensions with the Schläfli symbols {4,3...3,4} and containing the symmetry of Coxeter group R_n (or B^~_n-1) for n>=3.

The tessellation is constructed from 4 n-hypercubes per ridge. The vertex figure is a cross-polytope {3...3,4}.

The hypercubic honeycombs are self-dual.

Coxeter named this family as δ_n+1 for an n-dimensional honeycomb.

Wythoff construction classes by dimension

There are two general forms of the hypercube honeycombs, the regular form with identical hypercubic facets and one semiregular, with alternating hypercube facets, like a checkerboard.

A third form is generated by an expansion operation applied to the regular form, creating facets in place of all lower dimensional elements. For example, an expanded cubic honeycomb has cubic cells centered on the original cubes, on the original faces, on the original edges, on the original vertices, creating 3 colors of cells around in vertex in 1:3:3:1 counts.

A more general class of honeycombs is called, orthotopic honeycombs, with identical topology, but allow each axial direction to have different edge lengths, for example with rectangle and cuboid facets in 2 and 3 dimensions.

δ_n Name Schläfli symbols Coxeter-Dynkin diagrams

Orthotopic
{∞}ⁿ
(2^m colors, m<n) Regular
{4,3^n-1,4}
(1 color) Checkerboard
{4,3^n-4,3^1,1}
(2 colors) Expanded
t_0,n-1{4,3^n-1,4}
(n colors)

δ₂ Apeirogon {∞}

δ₃ Square tiling {∞}²
{4,4}

δ₄ Cubic honeycomb {∞}³
{4,3,4}
{4,3^1,1}

δ₅ Tesseractic honeycomb {∞}⁴
{4,3²,4}
{4,3,3^1,1}

δ₆ Penteractic honeycomb {∞}⁵
{4,3³,4}
{4,3²,3^1,1}

δ₇ Hexeractic honeycomb {∞}⁶
{4,3⁴,4}
{4,3³,3^1,1}

δ₈ Hepteractic honeycomb {∞}⁷
{4,3⁵,4}
{4,3⁴,3^1,1}

δ₉ Octeractic honeycomb {∞}⁸
{4,3⁶,4}
{4,3⁵,3^1,1}

δ₁₀ Enneractic honeycomb {∞}⁹
{4,3⁷,4}
{4,3⁶,3^1,1}

δ₁₁ Dekeractic honeycomb {∞}¹⁰
{4,3⁸,4}
{4,3⁶,3^1,1}

δ_n n-hypercubic honeycomb {∞}ⁿ
{4,3^n-3,4}
{4,3^n-4,3^1,1} ...

See also

Alternated hypercubic honeycomb

References

Coxeter, H.S.M. Regular Polytopes, (3rd edition, 1973), Dover edition, ISBN 0-486-61480-8

pp. 122-123, 1973. (The lattice of hypercubes γ_n form the cubic honeycombs, δ_n+1)

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}

p. 296, Table II: Regular honeycombs, δ_n+1

Categories:
Honeycombs (geometry)
Polytopes

A regular square tiling.	A partial-filled cubic honeycomb in its regular form.
A checkboard square tiling	A partially-filled cubic honeycomb checkerboard.
An expanded square tiling	Expanded cubic honeycomb

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δ_n	Name	Schläfli symbols	Coxeter-Dynkin diagrams
δ_n	Name	Schläfli symbols	Orthotopic {∞}ⁿ (2^m colors, m<n)	Regular {4,3^n-1,4} (1 color)	Checkerboard {4,3^n-4,3^1,1} (2 colors)	Expanded t_0,n-1{4,3^n-1,4} (n colors)
δ₂	Apeirogon	{∞}
δ₃	Square tiling	{∞}² {4,4}
δ₄	Cubic honeycomb	{∞}³ {4,3,4} {4,3^1,1}
δ₅	Tesseractic honeycomb	{∞}⁴ {4,3²,4} {4,3,3^1,1}
δ₆	Penteractic honeycomb	{∞}⁵ {4,3³,4} {4,3²,3^1,1}
δ₇	Hexeractic honeycomb	{∞}⁶ {4,3⁴,4} {4,3³,3^1,1}
δ₈	Hepteractic honeycomb	{∞}⁷ {4,3⁵,4} {4,3⁴,3^1,1}
δ₉	Octeractic honeycomb	{∞}⁸ {4,3⁶,4} {4,3⁵,3^1,1}
δ₁₀	Enneractic honeycomb	{∞}⁹ {4,3⁷,4} {4,3⁶,3^1,1}
δ₁₁	Dekeractic honeycomb	{∞}¹⁰ {4,3⁸,4} {4,3⁶,3^1,1}

δ_n	n-hypercubic honeycomb	{∞}ⁿ {4,3^n-3,4} {4,3^n-4,3^1,1}	...

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