Rectified 10-simplexes

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10-simplex t0.svg
10-simplex
CDel node 1.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.png
10-simplex t1.svg
Rectified 10-simplex
CDel node.pngCDel 3.pngCDel node 1.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.png
10-simplex t2.svg
Birectified 10-simplex
CDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node 1.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.png
10-simplex t3.svg
Trirectified 10-simplex
CDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node 1.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.png
10-simplex t4.svg
Quadrirectified 10-simplex
CDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node 1.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.png
Orthogonal projections in A9 Coxeter plane

In ten-dimensional geometry, a rectified 10-simplex is a convex uniform 10-polytope, being a rectification of the regular 10-simplex.

These polytopes are part of a family of 527 uniform 10-polytopes with A10 symmetry.

There are unique 5 degrees of rectifications including the zeroth, the 10-simplex itself. Vertices of the rectified 10-simplex are located at the edge-centers of the 10-simplex. Vertices of the birectified 10-simplex are located in the triangular face centers of the 10-simplex. Vertices of the trirectified 10-simplex are located in the tetrahedral cell centers of the 10-simplex. Vertices of the quadrirectified 10-simplex are located in the 5-cell centers of the 10-simplex.

Rectified 10-simplex[edit]

Rectified 10-simplex
Type uniform polyxennon
Schläfli symbol t1{3,3,3,3,3,3,3,3,3}
Coxeter-Dynkin diagrams CDel node.pngCDel 3.pngCDel node 1.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.png
8-faces
7-faces
6-faces
5-faces
4-faces
Cells
Faces
Edges 495
Vertices 55
Vertex figure 9-simplex prism
Petrie polygon decagon
Coxeter groups A10, [3,3,3,3,3,3,3,3,3]
Properties convex

The rectified 10-simplex is the vertex figure of the 11-demicube.

Alternate names[edit]

  • Rectified hendecaxennon (Acronym ru) (Jonathan Bowers)[1]

Coordinates[edit]

The Cartesian coordinates of the vertices of the rectified 10-simplex can be most simply positioned in 11-space as permutations of (0,0,0,0,0,0,0,0,0,1,1). This construction is based on facets of the rectified 11-orthoplex.

Images[edit]

orthographic projections
Ak Coxeter plane A10 A9 A8
Graph 10-simplex t1.svg 10-simplex t1 A9.svg 10-simplex t1 A8.svg
Dihedral symmetry [11] [10] [9]
Ak Coxeter plane A7 A6 A5
Graph 10-simplex t1 A7.svg 10-simplex t1 A6.svg 10-simplex t1 A5.svg
Dihedral symmetry [8] [7] [6]
Ak Coxeter plane A4 A3 A2
Graph 10-simplex t1 A4.svg 10-simplex t1 A3.svg 10-simplex t1 A2.svg
Dihedral symmetry [5] [4] [3]

Birectified 10-simplex[edit]

Birectified 10-simplex
Type uniform polyyotton
Schläfli symbol t2{3,3,3,3,3,3,3,3,3}
Coxeter-Dynkin diagrams CDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node 1.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.png
8-faces
7-faces
6-faces
5-faces
4-faces
Cells
Faces
Edges 1980
Vertices 165
Vertex figure {3}x{3,3,3,3,3,3}
Coxeter groups A10, [3,3,3,3,3,3,3,3,3]
Properties convex

Alternate names[edit]

  • Birectified hendecaxennon (Acronym bru) (Jonathan Bowers)[2]

Coordinates[edit]

The Cartesian coordinates of the vertices of the birectified 10-simplex can be most simply positioned in 11-space as permutations of (0,0,0,0,0,0,0,0,1,1,1). This construction is based on facets of the birectified 11-orthoplex.

Images[edit]

orthographic projections
Ak Coxeter plane A10 A9 A8
Graph 10-simplex t2.svg 10-simplex t2 A9.svg 10-simplex t2 A8.svg
Dihedral symmetry [11] [10] [9]
Ak Coxeter plane A7 A6 A5
Graph 10-simplex t2 A7.svg 10-simplex t2 A6.svg 10-simplex t2 A5.svg
Dihedral symmetry [8] [7] [6]
Ak Coxeter plane A4 A3 A2
Graph 10-simplex t2 A4.svg 10-simplex t2 A3.svg 10-simplex t2 A2.svg
Dihedral symmetry [5] [4] [3]

Trirectified 10-simplex[edit]

Trirectified 10-simplex
Type uniform polyxennon
Schläfli symbol t3{3,3,3,3,3,3,3,3,3}
Coxeter-Dynkin diagrams CDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node 1.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.png
8-faces
7-faces
6-faces
5-faces
4-faces
Cells
Faces
Edges 4620
Vertices 330
Vertex figure {3,3}x{3,3,3,3,3}
Coxeter groups A10, [3,3,3,3,3,3,3,3,3]
Properties convex

Alternate names[edit]

  • Trirectified hendecaxennon (Jonathan Bowers)[3]

Coordinates[edit]

The Cartesian coordinates of the vertices of the trirectified 10-simplex can be most simply positioned in 11-space as permutations of (0,0,0,0,0,0,0,1,1,1,1). This construction is based on facets of the triirectified 11-orthoplex.

Images[edit]

orthographic projections
Ak Coxeter plane A10 A9 A8
Graph 10-simplex t3.svg 10-simplex t3 A9.svg 10-simplex t3 A8.svg
Dihedral symmetry [11] [10] [9]
Ak Coxeter plane A7 A6 A5
Graph 10-simplex t3 A7.svg 10-simplex t3 A6.svg 10-simplex t3 A5.svg
Dihedral symmetry [8] [7] [6]
Ak Coxeter plane A4 A3 A2
Graph 10-simplex t3 A4.svg 10-simplex t3 A3.svg 10-simplex t3 A2.svg
Dihedral symmetry [5] [4] [3]

Quadrirectified 10-simplex[edit]

Quadrirectified 10-simplex
Type uniform polyxennon
Schläfli symbol t4{3,3,3,3,3,3,3,3,3}
Coxeter-Dynkin diagrams CDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node 1.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.pngCDel 3.pngCDel node.png
8-faces
7-faces
6-faces
5-faces
4-faces
Cells
Faces
Edges 6930
Vertices 462
Vertex figure {3,3,3}x{3,3,3,3}
Coxeter groups A10, [3,3,3,3,3,3,3,3,3]
Properties convex

Alternate names[edit]

  • Quadrirectified hendecaxennon (Acronym teru) (Jonathan Bowers)[4]

Coordinates[edit]

The Cartesian coordinates of the vertices of the quadrirectified 10-simplex can be most simply positioned in 11-space as permutations of (0,0,0,0,0,0,1,1,1,1,1). This construction is based on facets of the quadrirectified 11-orthoplex.

Images[edit]

orthographic projections
Ak Coxeter plane A10 A9 A8
Graph 10-simplex t4.svg 10-simplex t4 A9.svg 10-simplex t4 A8.svg
Dihedral symmetry [11] [10] [9]
Ak Coxeter plane A7 A6 A5
Graph 10-simplex t4 A7.svg 10-simplex t4 A6.svg 10-simplex t4 A5.svg
Dihedral symmetry [8] [7] [6]
Ak Coxeter plane A4 A3 A2
Graph 10-simplex t4 A4.svg 10-simplex t4 A3.svg 10-simplex t4 A2.svg
Dihedral symmetry [5] [4] [3]

Notes[edit]

  1. ^ Klitzing, (o3x3o3o3o3o3o3o3o3o - ru)
  2. ^ Klitzing, (o3o3x3o3o3o3o3o3o3o - bru)
  3. ^ Klitzing, (o3o3o3x3o3o3o3o3o3o - tru)
  4. ^ Klitzing, (o3o3o3o3x3o3o3o3o3o - teru)

References[edit]

  • 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, ISBN 978-0-471-01003-6 [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]
  • Norman Johnson Uniform Polytopes, Manuscript (1991)
    • N.W. Johnson: The Theory of Uniform Polytopes and Honeycombs, Ph.D. (1966)
  • Richard Klitzing, 10D, uniform polytopes (polyxenna) x3o3o3o3o3o3o3o3o3o - ux, o3x3o3o3o3o3o3o3o3o - ru, o3o3x3o3o3o3o3o3o3o - bru, o3o3o3x3o3o3o3o3o3o - tru, o3o3o3o3x3o3o3o3o3o - teru

External links[edit]