E₈ polytope

Orthographic projections in the E₈ Coxeter plane
File:E8 graph.svg 4₂₁ Template:CDD	File:2 41 t0 E8.svg 2₄₁ Template:CDD	File:Gosset 1 42 polytope petrie.svg 1₄₂ Template:CDD

In 8-dimensional geometry, there are 255 uniform polytopes with E₈ symmetry. The three simplest forms are the 4₂₁, 2₄₁, and 1₄₂ polytopes, composed of 240, 2160 and 17280 vertices respectively.

These polytopes can be visualized as symmetric orthographic projections in Coxeter planes of the E₈ Coxeter group, and other subgroups.

Graphs

Symmetric orthographic projections of these 255 polytopes can be made in the E₈, E₇, E₆, D₇, D₆, D₅, D₄, D₃, A₇, A₅ Coxeter planes. A_k has [k+1] symmetry, D_k has [2(k-1)] symmetry, and E₆, E₇, E₈ have [12], [18], [30] symmetry respectively. In addition there are two other degrees of fundamental invariants, order [20] and [24] for the E₈ group that represent Coxeter planes.

11 of these 255 polytopes are each shown in 14 symmetry planes, with vertices and edges drawn, and vertices colored by the number of overlapping vertices in each projective position.

#	Coxeter plane projections															Coxeter-Dynkin diagram Name
#	E₈ [30]	E₇ [18]	E₆ [12]	[24]	[20]	D₄-E₆ [6]	A₃ D₃ [4]	A₂ D₄ [6]	D₅ [8]	A₄ D₆ [10]	D₇ [12]	A₆ B₇ [14]	B₈ [16/2]	A₅ [6]	A₇ [8]	Coxeter-Dynkin diagram Name
1	File:4 21 t0 E8.svg	File:4 21 t0 E7.svg	File:4 21 t0 E6.svg	File:4 21 t0 p20.svg	File:4 21 t0 p24.svg	File:4 21 t0 mox.svg	File:4 21 t0 B2.svg	File:4 21 t0 B3.svg	File:4 21 t0 B4.svg	File:4 21 t0 B5.svg	File:4 21 t0 B6.svg	File:4 21 t0 B7.svg	File:4 21 t0 B8.svg	File:4 21 t0 A5.svg	File:4 21 t0 A7.svg	Template:CDD 4₂₁ (fy)
2	File:4 21 t1 E8.svg	File:4 21 t1 E7.svg	File:4 21 t1 E6.svg	File:4 21 t1 p20.svg	File:4 21 t1 p24.svg	File:4 21 t1 mox.svg	File:4 21 t1 B2.svg	File:4 21 t1 B3.svg	File:4 21 t1 B4.svg	File:4 21 t1 B5.svg	File:4 21 t1 B6.svg	File:4 21 t1 B7.svg	File:4 21 t1 B8.svg	File:4 21 t1 A5.svg	File:4 21 t1 A7.svg	Template:CDD Rectified 4₂₁ (riffy)
3	File:4 21 t2 E8.svg	File:4 21 t2 E7.svg	File:4 21 t2 E6.svg	File:4 21 t2 p20.svg	File:4 21 t2 p24.svg	File:4 21 t2 mox.svg	File:4 21 t2 B2.svg	File:4 21 t2 B3.svg	File:4 21 t2 B4.svg	File:4 21 t2 B5.svg	File:4 21 t2 B6.svg	File:4 21 t2 B7.svg	File:4 21 t2 B8.svg	File:4 21 t2 A5.svg	File:4 21 t2 A7.svg	Template:CDD Birectified 4₂₁ (borfy)
4		File:4 21 t3 E7.svg	File:4 21 t3 E6.svg			File:4 21 t3 mox.svg	File:4 21 t3 B2.svg	File:4 21 t3 B3.svg	File:4 21 t3 B4.svg	File:4 21 t3 B5.svg	File:4 21 t3 B6.svg	File:4 21 t3 B7.svg		File:4 21 t3 A5.svg	File:4 21 t3 A7.svg	Template:CDD Trirectified 4₂₁ (torfy)
5		File:4 21 t4 E7.svg	File:4 21 t4 E6.svg			File:4 21 t4 mox.svg	File:4 21 t4 B2.svg	File:4 21 t4 B3.svg	File:4 21 t4 B4.svg	File:4 21 t4 B5.svg	File:4 21 t4 B6.svg			File:4 21 t4 A5.svg	File:4 21 t4 A7.svg	Template:CDD Rectified 1₄₂ (buffy)
6	File:2 41 t1 E8.svg	File:2 41 t1 E7.svg	File:2 41 t1 E6.svg	File:2 41 t1 p20.svg	File:2 41 t1 p24.svg	File:2 41 t1 mox.svg	File:2 41 t1 B2.svg	File:2 41 t1 B3.svg	File:2 41 t1 B4.svg	File:2 41 t1 B5.svg	File:2 41 t1 B6.svg	File:2 41 t1 B7.svg	File:2 41 t1 B8.svg	File:2 41 t1 A5.svg	File:2 41 t1 A7.svg	Template:CDD Rectified 2₄₁ (robay)
7	File:2 41 t0 E8.svg	File:2 41 t0 E7.svg	File:2 41 t0 E6.svg	File:2 41 t0 p20.svg	File:2 41 t0 p24.svg	File:2 41 t0 mox.svg	File:2 41 t0 B2.svg	File:2 41 t0 B3.svg	File:2 41 t0 B4.svg	File:2 41 t0 B5.svg	File:2 41 t0 B6.svg	File:2 41 t0 B7.svg	File:2 41 t0 B8.svg	File:2 41 t0 A5.svg	File:2 41 t0 A7.svg	Template:CDD 2₄₁ (bay)
8		File:2 41 t01 E7.svg	File:2 41 t01 E6.svg				File:2 41 t01 B2.svg	File:2 41 t01 B3.svg	File:2 41 t01 B4.svg	File:2 41 t01 B5.svg	File:2 41 t01 B6.svg	File:2 41 t01 B7.svg		File:2 41 t01 A5.svg	File:2 41 t01 A7.svg	Template:CDD Truncated 2₄₁
9	File:4 21 t01 E8.svg	File:4 21 t01 E7.svg	File:4 21 t01 E6.svg	File:4 21 t01 p20.svg	File:4 21 t01 p24.svg		File:4 21 t01 B2.svg	File:4 21 t01 B3.svg	File:4 21 t01 B4.svg	File:4 21 t01 B5.svg	File:4 21 t01 B6.svg	File:4 21 t01 B7.svg	File:4 21 t01 B8.svg	File:4 21 t01 A5.svg	File:4 21 t01 A7.svg	Template:CDD Truncated 4₂₁ (tiffy)
10	File:Gosset 1 42 polytope petrie.svg	File:1 42 t0 e7.svg	File:1 42 polytope E6 Coxeter plane.svg	File:1 42 t0 p20.svg	File:1 42 t0 p24.svg	File:1 42 t0 mox.svg	File:1 42 t0 B2.svg	File:1 42 t0 B3.svg	File:1 42 t0 B4.svg	File:1 42 t0 B5.svg	File:1 42 t0 B6.svg	File:1 42 t0 B7.svg	File:1 42 t0 B8.svg	File:1 42 t0 A5.svg	File:1 42 t0 A7.svg	Template:CDD 1₄₂ (bif)
11			File:1 42 t01 E6.svg				File:1 42 t01 B2.svg	File:1 42 t01 B3.svg	File:1 42 t01 B4.svg	File:1 42 t01 B5.svg	File:1 42 t01 B6.svg			File:1 42 t01 A5.svg	File:1 42 t01 A7.svg	Template:CDD Truncated 1₄₂

References

H.S.M. Coxeter:
- H.S.M. Coxeter, Regular Polytopes, 3rd Edition, Dover New York, 1973
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, Template:ISBN^[1]
- (Paper 22) H.S.M. Coxeter, Regular and Semi Regular Polytopes I, [Math. Zeit. 46 (1940) 380-407, MR 2,10]
- (Paper 23) H.S.M. Coxeter, Regular and Semi-Regular Polytopes II, [Math. Zeit. 188 (1985) 559-591]
- (Paper 24) H.S.M. Coxeter, Regular and Semi-Regular Polytopes III, [Math. Zeit. 200 (1988) 3-45]
N.W. Johnson: The Theory of Uniform Polytopes and Honeycombs, Ph.D. Dissertation, University of Toronto, 1966
Template:KlitzingPolytopes

Notes

↑ Wiley::Kaleidoscopes: Selected Writings of H.S.M. Coxeter

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Template:Polytopes

[1] Wiley::Kaleidoscopes: Selected Writings of H.S.M. Coxeter

[1]

E8 polytope

Graphs

References

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E₈ polytope