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Wythoff symbol
From Wikipedia, the free encyclopedia
In geometry, a Wythoff symbol is a short-hand notation, created by mathematician Willem Abraham Wythoff, for naming the regular and semiregular polyhedra using a kaleidoscopic construction, by representing them as tilings on the surface of a sphere, Euclidean plane, or hyperbolic plane.
The Wythoff symbol gives 3 numbers p,q,r and a positional vertical bar (|) which separate the numbers before or after it. Each number represents the order of mirrors at a vertex of the fundamental triangle.
Each symbol represents one uniform polyhedron or tiling, although the same tiling/polyhedron can have different Wythoff symbols from different symmetry generators. For example, the regular cube can be represented by 3 | 4 2 with Oh symmetry, and 2 4 | 2 as a square prism with 2 colors and D4h symmetry, as well as 2 2 2 | with 3 colors and D2h symmetry.
Contents |
There are 7 generator points with each set of p,q,r: (And a few special forms)
| General | Right triangle (r=2) | |||
|---|---|---|---|---|
| Description | Wythoff symbol |
Vertex configuration |
Wythoff symbol |
Vertex configuration |
| regular and quasiregular |
q | p r | (p.r)q | q | p 2 | pq |
| p | q r | (q.r)p | p | q 2 | qp | |
| r | p q | (q.p)r | 2 | p q | (q.p)2 | |
| truncated and expanded |
q r | p | q.2p.r.2p | q 2 | p | q.2p.2p |
| p r | q | p.2q.r.2q | p 2 | q | p.2q.2q | |
| p q | r | 2r.q.2r.p | p q | 2 | 4.q.4.p | |
| even-faced | p q r | | 2r.2q.2p | p q 2 | | 4.2q.2p |
| p q (r s) | | 2p.2q.-2p.-2q | p 2 (r s) | | 2p.4.-2p.4/3 | |
| snub | | p q r | 3.r.3.q.3.p | | p q 2 | 3.3.q.3.p |
| | p q r s | (4.p.4.q.4.r.4.s)/2 | - | - | |
There are three special cases:
- p q (r s) | - This is a mixture of p q r | and p q s |.
- | p q r - Snub forms (alternated) are give this otherwise unused symbol.
- | p q r s - A unique snub form for U75 that isn't Wythoff constructable.
The numbers p,q,r describe the fundamental triangle of the symmetry group: at its vertices, the generating mirrors meet in angles of π/p, π/q, π/r. On the sphere there are 3 main symmetry types: (3 3 2), (4 3 2), (5 3 2), and one infinite family (p 2 2), for any p. (All simple families have one right angle and so r=2.)
The position of the vertical bar in the symbol specifies a categorical position of the generator point within the fundamental triangle. The generator point can either be on or off each mirror, activated or not. This distinction creates 8 (23) possible forms, neglecting one where the generator point is on all the mirrors.
In this notation the mirrors are labeled by the reflection-order of the opposite vertex. The p,q,r values are listed before the bar if the corresponding mirror is active.
The one impossible symbol | p q r implies the the generator point is on all mirrors, which is only possible if the triangle is degenerate, reduced to a point. This unused symbol is therefore arbitrarily reassigned to represent the case where all mirrors are active, but odd-numbered reflected images are ignored. The resulting figure has rotational symmetry only.
This symbol is functionally similar to the more general Coxeter-Dynkin diagram, in which each node represents a mirror and the arcs between them – marked with numbers – the angles between the mirrors. (An arc representing a right angle is omitted.) A node is circled if the generator point is not on the mirror.
There are 4 symmetry classes of reflection on the sphere, and two for the Euclidean plane. A few of the infinitely many for the hyperbolic plane are also listed.
- (p 2 2) dihedral symmetry p=2,3,4... (Order 4p)
- (3 3 2) tetrahedral symmetry (Order 24)
- (3 3 3) *333 symmetry (Euclidean plane)
- (4 3 3) *433 symmetry (Hyperbolic plane)
- (4 4 3) *443 symmetry (Hyperbolic plane)
- (4 4 4) *444 symmetry (Hyperbolic plane)
- (4 3 2) octahedral symmetry (Order 48)
- (4 4 2) - *442 symmetry - 45-45-90 triangle (Includes square domain (2 2 2 2))
- (5 3 2) icosahedral symmetry (Order 120)
- (5 4 2) - *542 symmetry (Hyperbolic plane)
- (5 5 2) - *552 symmetry (Hyperbolic plane)
- (3 3 3) - *333 symmetry - 60-60-60 triangle
- (6 3 2) - *632 symmetry - 30-60-90 triangle
- (7 3 2) - *732 symmetry (Hyperbolic plane)
- (8 3 2) - *832 symmetry (Hyperbolic plane)
| Dihedral spherical | Spherical | |||
|---|---|---|---|---|
| D2h | D3h | Td | Oh | Ih |
| *222 | *322 | *332 | *432 | *532 |
 (2 2 2) |
 (3 2 2) |
 ( 3 3 2) |
 (4 3 2) |
 (5 3 2) |
The above symmetry groups only includes the integer solutions on the sphere. The list of Schwarz triangles includes rational numbers, and determine the full set of solutions of uniform polyhedrons.
| Euclidean plane | Hyperbolic plane | ||||
|---|---|---|---|---|---|
| p4m | p3m | p6m | |||
| *442 | *333 | *632 | *732 | *542 | *433 |
 (4 4 2) |
 (3 3 3) |
 (6 3 2) |
 (7 3 2) |
 (5 4 2) |
 (4 3 3) |
In the tilings above, each triangle is a fundamental domain, colored by even and odd reflections.
An selection of tilings created by the Wythoff construction are given below.
| (p q 2) | Fund. triangles |
Parent | Truncated | Rectified | Bitruncated | Birectified (dual) |
Cantellated | Omnitruncated (Cantitruncated) |
Snub |
|---|---|---|---|---|---|---|---|---|---|
| Wythoff symbol | q | p 2 | 2 q | p | 2 | p q | 2 p | q | p | q 2 | p q | 2 | p q 2 | | | p q 2 | |
| Schläfli symbol | t0{p,q} | t0,1{p,q} | t1{p,q} | t1,2{p,q} | t2{p,q} | t0,2{p,q} | t0,1,2{p,q} | s{p,q} | |
| Coxeter-Dynkin diagram |     |
|
|
|
|
|
|
 |
|
| Vertex figure | pq | (q.2p.2p) | (p.q.p.q) | (p.2q.2q) | qp | (p.4.q.4) | (4.2p.2q) | (3.3.p.3.q) | |
| Tetrahedral (3 3 2) |
|
 {3,3} |
 (3.6.6) |
 (3.3a.3.3a) |
 (3.6.6) |
 {3,3} |
 (3a.4.3b.4) |
 (4.6a.6b) |
 (3.3.3a.3.3b) |
| Octahedral (4 3 2) |
|
 {4,3} |
 (3.8.8) |
 (3.4.3.4) |
 (4.6.6) |
 {3,4} |
 (3.4.4a.4) |
 (4.6.8) |
 (3.3.3a.3.4) |
| Icosahedral (5 3 2) |
|
 {5,3} |
 (3.10.10) |
 (3.5.3.5) |
 (5.6.6) |
 {3,5} |
 (3.4.5.4) |
 (4.6.10) |
 (3.3.3a.3.5) |
One representative hyperbolic tiling is given, and shown as a Poincaré disk projection.
| (p q 2) | Fund. triangles |
Parent | Truncated | Rectified | Bitruncated | Birectified (dual) |
Cantellated | Omnitruncated (Cantitruncated) |
Snub |
|---|---|---|---|---|---|---|---|---|---|
| Wythoff symbol | q | p 2 | 2 q | p | 2 | p q | 2 p | q | p | q 2 | p q | 2 | p q 2 | | | p q 2 | |
| Schläfli symbol | t0{p,q} | t0,1{p,q} | t1{p,q} | t1,2{p,q} | t2{p,q} | t0,2{p,q} | t0,1,2{p,q} | s{p,q} | |
| Coxeter-Dynkin diagram | |
|
|
|
|
|
|
|
|
| Vertex figure | pq | (q.2p.2p) | (p.q.p.q) | (p.2q.2q) | qp | (p.4.q.4) | (4.2p.2q) | (3.3.p.3.q) | |
| Square tiling (4 4 2) |
|
 {4,4} |
 4.8.8 |
 4.4a.4.4a |
 4.8.8 |
 {4,4} |
 4.4a.4b.4a |
 4.8.8 |
 3.3.4a.3.4b |
| (Hyperbolic plane) (5 4 2) |
|
 {5,4} |
 4.10.10 |
 4.5.4.5 |
 5.8.8 |
 {4,5} |
 4.4.5.4 |
 4.8.10 |
 3.3.4.3.5 |
| (Hyperbolic plane) (5 5 2) |
 {5,5} |
 5.10.10 |
 5.5.5.5 |
 5.10.10 |
 {5,5} |
 4.4.5.4 |
 4.10.10 |
 3.3.5.3.5 |
|
| Hexagonal tiling (6 3 2) |
|
 {6,3} |
 3.12.12 |
 3.6.3.6 |
 6.6.6 |
 {3,6} |
 3.4.6.4 |
 4.6.12 |
 3.3.3.3.6 |
| (Hyperbolic plane) (7 3 2) |
|
 {7,3} |
 3.14.14 |
 3.7.3.7 |
 7.6.6 |
 {3,7} |
 3.4.7.4 |
 4.6.14 |
 3.3.3.3.7 |
| (Hyperbolic plane) (8 3 2) |
 {8,3} |
 3.16.16 |
 3.8.3.8 |
 8.6.6 |
 {3,8} |
 3.4.8.4 |
 4.6.16 |
 3.3.3.3.8 |
The Coxeter-Dynkin diagram is given in a linear form, although it is actually a triangle, with the trailing segment r connecting to the first node.
| Wythoff symbol (p q r) |
Fund. triangles |
q | p r | r q | p | r | p q | r p | q | p | q r | p q | r | p q r | | | p q r |
|---|---|---|---|---|---|---|---|---|---|
| Coxeter-Dynkin diagram |  |
|
|
|
|
|
|
|
|
| Vertex figure | (p.q)r | (r.2p.q.2p) | (p.r)q | (q.2r.p.2r) | (q.r)p | (q.2r.p.2r) | (r.2q.p.2q) | (3.r.3.q.3.p) | |
| Triangular (3 3 3) |
|
 (3.3)3 |
 3.6.3.6 |
 (3.3)3 |
 3.6.3.6 |
 (3.3)3 |
 3.6.3.6 |
 6.6.6 |
 3.3.3.3.3.3 |
| Hyperbolic (4 3 3) |
|
 (3.4)3 |
 3.8.3.8 |
 (3.4)3 |
 3.6.4.6 |
 (3.3)4 |
 3.6.4.6 |
 6.6.8 |
 3.3.3.3.3.4 |
| Hyperbolic (4 4 3) |
 (3.4)4 |
 3.8.4.8 |
 (3.4)4 |
 3.6.4.6 |
 (3.4)4 |
 4.6.4.6 |
 6.8.8 |
 3.3.3.4.3.4 |
|
| Hyperbolic (4 4 4) |
 (4.4)4 |
 4.8.4.8 |
 (4.4)4 |
 4.8.4.8 |
 (4.4)4 |
 4.8.4.8 |
 8.8.8 |
 3.4.3.4.3.4 |
Tilings are shown as polyhedra. Some of the forms are degenerate, given with brackets for vertex figures, with overlapping edges or verices.
| (p q 2) | Fund. triangle |
Parent | Truncated | Rectified | Bitruncated | Birectified (dual) |
Cantellated | Omnitruncated (Cantitruncated) |
Snub |
|---|---|---|---|---|---|---|---|---|---|
| Wythoff symbol | q | p 2 | 2 q | p | 2 | p q | 2 p | q | p | q 2 | p q | 2 | p q 2 | | | p q 2 | |
| Schläfli symbol | t0{p,q} | t0,1{p,q} | t1{p,q} | t1,2{p,q} | t2{p,q} | t0,2{p,q} | t0,1,2{p,q} | s{p,q} | |
| Coxeter-Dynkin diagram | |
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|
| Vertex figure | pq | (q.2p.2p) | (p.q.p.q) | (p.2q.2q) | qp | (p.4.q.4) | (4.2p.2q) | (3.3.p.3.q) | |
| Icosahedral (5/2 3 2) |
 {3,5/2} |
 (5/2.6.6) |
 (3.5/2)2 |
 [3.10/2.10/2] |
 {5/2,3} |
 [3.4.5/2.4] |
 [4.10/2.6] |
 (3.3.3.3.5/2) |
|
| Icosahedral (5 5/2 2) |
 {5,5/2} |
 (5/2.10.10) |
 (5/2.5)2 |
 [5.10/2.10/2] |
 {5/2,5} |
 (5/2.4.5.4) |
 [4.10/2.10] |
 (3.3.5/2.3.5) |
- Coxeter Regular Polytopes, Third edition, (1973), Dover edition, ISBN 0-486-61480-8 (Chapter V: The Kaleidoscope, Section: 5.7 Wythoff's construction)
- Coxeter The Beauty of Geometry: Twelve Essays, Dover Publications, 1999, ISBN 0-486-40919-8 (Chapter 3: Wythoff's Construction for Uniform Polytopes)
- Coxeter, Longuet-Higgins, Miller, Uniform polyhedra, Phil. Trans. 1954, 246 A, 401-50.
- Wenninger, Magnus (1974). Polyhedron Models. Cambridge University Press. ISBN 0-521-09859-9. pp. 9-10.
- Eric W. Weisstein, Wythoff symbol at MathWorld.
- The Wythoff symbol
- Wythoff symbol
- Displays Uniform Polyhedra using Wythoff's construction method
- Description of Wythoff Constructions
- KaleidoTile 3 Free educational software for Windows by Jeffrey Weeks that generated many of the images on the page.
- Hatch, Don. Hyperbolic Planar Tessellations.