Alternated hypercubic honeycomb

Alternated hypercubic honeycomb: An alternated square tiling is another square tiling, but having two types of squares, alternating in a checkerboard pattern.

A twice alternated square tiling.

A partially-filled alternated cubic honeycomb with tetrahedral and octahedral cells.

A subsymmetry colored alternated cubic honeycomb.

In geometry, the alternated hypercube honeycomb (or demicubic honeycomb) is a dimensional infinite series of honeycombs, based on the hypercube honeycomb with an alternation operation. It is given a Schläfli symbol h{4,3...3,4} representing the regular form with half the vertices removed and containing the symmetry of Coxeter group ${\tilde{B}}_{n-1}$ for n ≥ 4. A lower symmetry form ${\tilde{D}}_{n-1}$ can be created by removing another mirror on a order-4 peak.

The alternated hypercube facets become demihypercubes, and the deleted vertices create new orthoplex facets. The vertex figure for honeycombs of this family are rectified orthoplexes.

These are also named as hδ_n for an (n-1)-dimensional honeycomb.

hδ_n Name Schläfli
symbol Coxeter-Dynkin diagrams

${\tilde{B}}_{n-1}$ ${\tilde{D}}_{n-1}$

hδ₂ Apeirogon {∞}

hδ₃ Alternated square tiling
(Same as regular square tiling {4,4}) h{4,4}=t₁{4,4}
t_0,2{4,4}

hδ₄ Alternated cubic honeycomb h{4,3,4}
{3^1,1,4}

hδ₅ Alternated tesseractic honeycomb or
demitesseractic tetracomb
(Same as regular {3,3,4,3}) h{4,3²,4}
{3^1,1,3,4}
{3^1,1,1,1}

hδ₆ Demipenteractic honeycomb h{4,3³,4}
{3^1,1,3²,4}
{3^1,1,3,3^1,1}

hδ₇ Demihexeractic honeycomb h{4,3⁴,4}
{3^1,1,3³,4}
{3^1,1,3²,3^1,1}

hδ₈ Demihepteractic honeycomb h{4,3⁵,4}
{3^1,1,3⁴,4}
{3^1,1,3³,3^1,1}

hδ₉ Demiocteractic honeycomb h{4,3⁶,4}
{3^1,1,3⁵,4}
{3^1,1,3⁴,3^1,1}

hδ₁₀ Demienneractic honeycomb h{4,3⁷,4}
{3^1,1,3⁶,4}
{3^1,1,3⁵,3^1,1}

hδ₁₁ Demidekeractic honeycomb h{4,3⁸,4}
{3^1,1,3⁷,4}
{3^1,1,3⁶,3^1,1}

hδ_n n-demicubic honeycomb h{4,3^n-3,4}
{3^1,1,3^n-4,4}
{3^1,1,3^n-5,3^1,1} ...

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

An alternated square tiling is another square tiling, but having two types of squares, alternating in a checkerboard pattern.	A twice alternated square tiling.
A partially-filled alternated cubic honeycomb with tetrahedral and octahedral cells.	A subsymmetry colored alternated cubic honeycomb.

hδ_n	Name	Schläfli symbol	Coxeter-Dynkin diagrams
${\tilde{B}}_{n-1}$	${\tilde{D}}_{n-1}$
hδ₂	Apeirogon	{∞}
hδ₃	Alternated square tiling (Same as regular square tiling {4,4})	h{4,4}=t₁{4,4} t_0,2{4,4}
hδ₄	Alternated cubic honeycomb	h{4,3,4} {3^1,1,4}
hδ₅	Alternated tesseractic honeycomb or demitesseractic tetracomb (Same as regular {3,3,4,3})	h{4,3²,4} {3^1,1,3,4} {3^1,1,1,1}
hδ₆	Demipenteractic honeycomb	h{4,3³,4} {3^1,1,3²,4} {3^1,1,3,3^1,1}
hδ₇	Demihexeractic honeycomb	h{4,3⁴,4} {3^1,1,3³,4} {3^1,1,3²,3^1,1}
hδ₈	Demihepteractic honeycomb	h{4,3⁵,4} {3^1,1,3⁴,4} {3^1,1,3³,3^1,1}
hδ₉	Demiocteractic honeycomb	h{4,3⁶,4} {3^1,1,3⁵,4} {3^1,1,3⁴,3^1,1}
hδ₁₀	Demienneractic honeycomb	h{4,3⁷,4} {3^1,1,3⁶,4} {3^1,1,3⁵,3^1,1}
hδ₁₁	Demidekeractic honeycomb	h{4,3⁸,4} {3^1,1,3⁷,4} {3^1,1,3⁶,3^1,1}

hδ_n	n-demicubic honeycomb	h{4,3^n-3,4} {3^1,1,3^n-4,4} {3^1,1,3^n-5,3^1,1}	...

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