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Semiregular polytope: Difference between revisions

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*[[5 21 honeycomb|5<sub>21</sub> honeycomb]] (9-ic check) (8D Euclidean honeycomb), {{CDD|nodea_1|3a|nodea|3a|nodea|3a|nodea|3a|nodea|3a|branch|3a|nodea|3a|nodea}}
*[[5 21 honeycomb|5<sub>21</sub> honeycomb]] (9-ic check) (8D Euclidean honeycomb), {{CDD|nodea_1|3a|nodea|3a|nodea|3a|nodea|3a|nodea|3a|branch|3a|nodea|3a|nodea}}


Gosset additionally allowed Euclidean honeycombs as facets of higher-dimensional Euclidean honeycombs, giving the following additional figures: {{harvtxt|Gosset|1900}}
{{harvtxt|Gosset|1900}} additionally allowed Euclidean honeycombs as facets of higher-dimensional Euclidean honeycombs, giving the following additional figures:
#Hypercubic honeycomb prism, named by Gosset as the (''n'' – 1)-ic semi-check (analogous to a single rank or file of a chessboard)
#Hypercubic honeycomb prism, named by Gosset as the (''n'' – 1)-ic semi-check (analogous to a single rank or file of a chessboard)
#Alternated hexagonal slab honeycomb (tetroctahedric semi-check), {{CDD|node_h|2x|node_h|6|node|3|node}}
#Alternated hexagonal slab honeycomb (tetroctahedric semi-check), {{CDD|node_h|2x|node_h|6|node|3|node}}

Revision as of 07:28, 24 September 2022

Gosset's figures
3D honeycombs

Simple tetroctahedric check

Complex tetroctahedric check
4D polytopes

Tetroctahedric

Octicosahedric

Tetricosahedric

In geometry, by Thorold Gosset's definition a semiregular polytope is usually taken to be a polytope that is vertex-transitive and has all its facets being regular polytopes. E.L. Elte compiled a longer list in 1912 as The Semiregular Polytopes of the Hyperspaces which included a wider definition.

Gosset's list

In three-dimensional space and below, the terms semiregular polytope and uniform polytope have identical meanings, because all uniform polygons must be regular. However, since not all uniform polyhedra are regular, the number of semiregular polytopes in dimensions higher than three is much smaller than the number of uniform polytopes in the same number of dimensions.

The three convex semiregular 4-polytopes are the rectified 5-cell, snub 24-cell and rectified 600-cell. The only semiregular polytopes in higher dimensions are the k21 polytopes, where the rectified 5-cell is the special case of k = 0. These were all listed by Gosset, but a proof of the completeness of this list was not published until the work of Makarov (1988) for four dimensions, and Blind & Blind (1991) for higher dimensions.

Gosset's 4-polytopes (with his names in parentheses)
Rectified 5-cell (Tetroctahedric),
Rectified 600-cell (Octicosahedric),
Snub 24-cell (Tetricosahedric), , or
Semiregular E-polytopes in higher dimensions
5-demicube (5-ic semi-regular), a 5-polytope,
221 polytope (6-ic semi-regular), a 6-polytope, or
321 polytope (7-ic semi-regular), a 7-polytope,
421 polytope (8-ic semi-regular), an 8-polytope,

Euclidean honeycombs

The tetrahedral-octahedral honeycomb in Euclidean 3-space has alternating tetrahedral and octahedral cells.

Semiregular polytopes can be extended to semiregular honeycombs. The semiregular Euclidean honeycombs are the tetrahedral-octahedral honeycomb (3D), gyrated alternated cubic honeycomb (3D) and the 521 honeycomb (8D).

Gosset honeycombs:

  1. Tetrahedral-octahedral honeycomb or alternated cubic honeycomb (Simple tetroctahedric check), (Also quasiregular polytope)
  2. Gyrated alternated cubic honeycomb (Complex tetroctahedric check),

Semiregular E-honeycomb:

Gosset (1900) additionally allowed Euclidean honeycombs as facets of higher-dimensional Euclidean honeycombs, giving the following additional figures:

  1. Hypercubic honeycomb prism, named by Gosset as the (n – 1)-ic semi-check (analogous to a single rank or file of a chessboard)
  2. Alternated hexagonal slab honeycomb (tetroctahedric semi-check),

Hyperbolic honeycombs

The hyperbolic tetrahedral-octahedral honeycomb has tetrahedral and two types of octahedral cells.

There are also hyperbolic uniform honeycombs composed of only regular cells (Coxeter & Whitrow 1950), including:

See also

References

  • Blind, G.; Blind, R. (1991). "The semiregular polytopes". Commentarii Mathematici Helvetici. 66 (1): 150–154. doi:10.1007/BF02566640. MR 1090169. S2CID 119695696.
  • Coxeter, H. S. M. (1973). Regular Polytopes (3rd ed.). New York: Dover Publications. ISBN 0-486-61480-8.
  • Coxeter, H. S. M.; Whitrow, G. J. (1950). "World-structure and non-Euclidean honeycombs". Proceedings of the Royal Society. 201 (1066): 417–437. Bibcode:1950RSPSA.201..417C. doi:10.1098/rspa.1950.0070. MR 0041576. S2CID 120322123.
  • Elte, E. L. (1912). The Semiregular Polytopes of the Hyperspaces. Groningen: University of Groningen. ISBN 1-4181-7968-X.
  • Gosset, Thorold (1900). "On the regular and semi-regular figures in space of n dimensions". Messenger of Mathematics. 29: 43–48.
  • Makarov, P. V. (1988). "On the derivation of four-dimensional semi-regular polytopes". Voprosy Diskret. Geom. Mat. Issled. Akad. Nauk. Mold. 103: 139–150, 177. MR 0958024.