Möbius–Kantor polygon

Möbius–Kantor polygon
Orthographic projection shown here with 4 red and 4 blue 3-edge triangles.
Shephard symbol	3(24)3
Schläfli symbol	₃{3}₃
Coxeter diagram
Edges	8 ₃{}
Vertices	8
Petrie polygon	Octagon
Shephard group	₃[3]₃, order 24
Dual polyhedron	Self-dual
Properties	Regular

In geometry, the Möbius–Kantor polygon is a regular complex polygon ₃{3}₃, , in $\mathbb {C} ^{2}$ . ₃{3}₃ has 8 vertices, and 8 ₃{} edges. It is self-dual.^[1] Although discovered by G.C. Shephard in 1952, represented as 3(24)3, Coxeter calls this a Möbius–Kantor polygon for sharing the structure of the Möbius–Kantor configuration.^[2]

Its symmetry is ₃[3]₃, order 24, isomorphic to the binary tetrahedral group.

Coordinates

The 8 vertex coordinates of this polygon can be given in $\mathbb {C} ^{3}$ , as follows:

(ω,−1,0), (0,ω,−ω²), (ω²,−1,0), (−1,0,1),
(−ω,0,1), (0,ω²,−ω), (−ω²,0,1), and (1,−1,0),

where $\omega ={\tfrac {-1+i{\sqrt {3}}}{2}}$ .

Real representation

It has a real representation as the 16-cell, , in 4-dimensional space, sharing the same 8 vertices. The 24 edges in the 16-cell are seen in the Möbius–Kantor polygon when the 8 triangular edges are drawn as 3-separate edges. The triangles are represented 2 sets of 4 red or blue outlines. The B4 projections are given in two different symmetry orientations between the two color sets.

orthographic projections
Plane	B₄		F₄
Graph
Symmetry	[8]		[12/3]

Related polytopes

It can also be seen as an alternation, , of , which has 16 vertices, and 24 edges. A compound of two, in dual positions, and , can be represented as , contains all 16 vertices of .

The regular Hessian polyhedron ₃{3}₃{3}₃, has this polygon as a facet and vertex figure.

Notes

^ Coxeter and Shephard, 1991, p.30 and p.47
^ Coxeter and Shephard, 1992

References

Shephard, G.C.; Regular complex polytopes, Proc. London math. Soc. Series 3, Vol 2, (1952), pp 82–97.
Coxeter, H. S. M. and Moser, W. O. J.; Generators and Relations for Discrete Groups (1965), esp pp 67–80.
Coxeter, H. S. M.; Regular Complex Polytopes, Cambridge University Press, (1974), second edition (1991).
Coxeter, H. S. M. and Shephard, G.C.; Portraits of a family of complex polytopes, Leonardo Vol 25, No 3/4, (1992), pp 239–244 [1]

[1] Coxeter and Shephard, 1991, p.30 and p.47

[2] Coxeter and Shephard, 1992

[1]

[2]