Uniform polyhedra may be regular, quasi-regular or semi-regular. The faces and vertices need not be convex, so many of the uniform polyhedra are also star polyhedra.
Excluding the infinite sets, there are 75 uniform polyhedra (or 76 if edges are allowed to coincide).
Categories include:
They can also be grouped by their symmetry group, which is done below.
The 57 nonprismatic nonconvex forms are compiled by Wythoff constructions within Schwarz triangles.
The convex uniform polyhedra can be named by Wythoff construction operations and can be named in relation to the regular form.
In more detail the convex uniform polyhedron are given below by their Wythoff construction within each symmetry group.
Within the Wythoff construction, there are repetitions created by lower symmetry forms. The cube is a regular polyhedron, and a square prism. The octahedron is a regular polyhedron, and a triangular antiprism. The octahedron is also a rectified tetrahedron. Many polyhedra are repeated from different construction sources and are colored differently.
The Wythoff construction applies equally to uniform polyhedra and uniform tilings on the surface of a sphere, so images of both are given. The spherical tilings including the set of hosohedrons and dihedrons which are degenerate polyhedra.
These symmetry groups are formed from the reflectional point groups in three dimensions, each represented by a fundamental triangle (p q r), where p>1, q>1, r>1 and 1/p+1/q+1/r<1.
The remaining nonreflective forms are constructed by alternation operations applied to the polyhedra with an even number of sides.
Along with the prisms and their dihedral symmetry, the spherical Wythoff construction process adds two regular classes which become degenerate as polyhedra - the dihedra and hosohedra, the first having only two faces, and the second only two vertices. The truncation of the regular hosohedra creates the prisms.
Below the convex uniform polyhedra are indexed 1-18 for the nonprismatic forms as they are presented in the tables by symmetry form. Repeated forms are in brackets.
For the infinite set of prismatic forms, they are indexed in four families:
| Parent | Truncated | Rectified | Bitruncated (truncated dual) | Birectified (dual) | Cantellated | Omnitruncated (Cantitruncated) | Snub | ||||||
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Extended 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} | ||||||
| Wythoff symbol p-q-2 | q | p 2 | 2 q | p | 2 | p q | 2 p | q | p | q 2 | p q | 2 | p q 2 | | | p q 2 | |||||
| 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) | (3.3.3.3) | (3.6.6) | {3,3} | (3.4.3.4) | (4.6.6) | (3.3.3.3.3) | |||||
| Octahedral 4-3-2 | {4,3} | (3.8.8) | (3.4.3.4) | (4.6.6) | {3,4} | (3.4.4.4) | (4.6.8) | (3.3.3.3.4) | |||||
| 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) | (3.3.3.3.5) |
And a sampling of Dihedral symmetries:
| (p 2 2) | Parent | Truncated | Rectified | Bitruncated (truncated dual) | Birectified (dual) | Cantellated | Omnitruncated (Cantitruncated) | Snub | |||||
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Extended Schläfli symbol | |||||||||||||
| t0{p,2} | t0,1{p,2} | t1{p,2} | t1,2{p,2} | t2{p,2} | t0,2{p,2} | t0,1,2{p,2} | s{p,2} | ||||||
| Wythoff symbol | 2 | p 2 | 2 2 | p | 2 | p 2 | 2 p | 2 | p | 2 2 | p 2 | 2 | p 2 2 | | | p 2 2 | |||||
| Coxeter-Dynkin diagram | - | Vertex figure | p2 | (2.2p.2p) | (p.2.p.2) | (p.4.4) | 2p | (p.4.2.4) | (4.2p.4) | (3.3.p.3.2) | |||
| Dihedral (2 2 2) | {2,2} | 2.4.4 | 2.2.2.2 | 4.4.2 | {2,2} | 2.4.2.4 | 4.4.4 | 3.3.3.2 | |||||
| Dihedral (3 2 2) | {3,2} | 2.6.6 | 2.3.2.3 | 4.4.3 | {2,3} | 2.4.3.4 | 4.4.6 | 3.3.3.3 | |||||
| Dihedral (4 2 2) | {4,2} | 2.8.8 | 2.4.2.4 | 4.4.4 | {2,4} | 2.4.4.4 | 4.4.8 | 3.3.3.4 | |||||
| Dihedral (5 2 2) | {5,2} | 2.10.10 | 2.5.2.5 | 4.4.5 | {2,5} | 2.4.5.4 | 4.4.10 | 3.3.3.5 | |||||
| Dihedral (6 2 2) | {6,2} | 2.12.12 | 2.6.2.6 | 4.4.6 | {2,6} | 2.4.6.4 | 4.4.12 | 3.3.3.6 |
Example forms from the cube and octahedron |
| Operation | Extended Schläfli symbols | Coxeter- Dynkin diagram | Description | |
|---|---|---|---|---|
| Parent | t0{p,q} | Any regular polyhedron or tiling | ||
| Rectified | t1{p,q} | The edges are fully truncated into single points. The polyhedron now has the combined faces of the parent and dual. | ||
| Birectified Also Dual | t2{p,q} | The birectified (dual) is a further truncation so that the original faces are reduced to points. New faces are formed under each parent vertex. The number of edges is unchanged and are rotated 90 degrees. The dual of the regular polyhedron {p, q} is also a regular polyhedron {q, p}. | ||
| Truncated | t0,1{p,q} | Each original vertex is cut off, with a new face filling the gap. Truncation has a degree of freedom, which has one solution that creates a uniform truncated polyhedron. The polyhedron has its original faces doubled in sides, and contains the faces of the dual. | ||
| Bitruncated | t1,2{p,q} | Same as truncated dual. | ||
| Cantellated (or rhombated) (Also expanded) | t0,2{p,q} | In addition to vertex truncation, each original edge is beveled with new rectangular faces appearing in their place. A uniform cantellation is half way between both the parent and dual forms. | ||
| Omnitruncated (or cantitruncated) (or rhombitruncated) | t0,1,2{p,q} | The truncation and cantellation operations are applied together to create an omnitruncated form which has the parent's faces doubled in sides, the dual's faces doubled in sides, and squares where the original edges existed. | ||
| Snub | s{p,q} | The snub takes the omnitruncated form and rectifies alternate vertices. (This operation is only possible for polyhedra with all even-sided faces.) All the original faces end up with half as many sides, and the squares degenerate into edges. Since the omnitruncated forms have 3 faces/vertex, new triangles are formed. Usually these alternated faceting forms are slightly deformed thereafter in order to end again as uniform polyhedra. The possibility of the latter variation depends on the degree of freedom. | ||
The tetrahedral symmetry of the sphere generates 5 uniform polyhedra, and a 6th form by a snub operation.
The tetrahedral symmetry is represented by a fundamental triangle with one vertex with two mirrors, and two vertices withr three mirrors, represented by the symbol (3 3 2). It can also be represented by the Coxeter group A2 or [3,3], as well as a Coxeter-Dynkin diagram: .
There are 24 triangles, visible in the faces of the tetrakis hexahedron and alternately colored triangles on a sphere:
| # | Name | Picture | Tiling | Coxeter-Dynkin and Schläfli symbols | Face counts by position | Element counts | ||||
|---|---|---|---|---|---|---|---|---|---|---|
| Pos. 2 [3] (4) | Pos. 1 []x[] (6) | Pos. 0 [3] (4) | Faces | Edges | Vertices | |||||
| 1 | tetrahedron | {3,3} | {3} | 4 | 6 | 4 | ||||
| [1] | Birectified tetrahedron (Same as tetrahedron) | t2{3,3} | {3} | 4 | 6 | 4 | ||||
| 2 | rectified tetrahedron (Same as octahedron) | t1{3,3} | {3} | {3} | 8 | 12 | 6 | |||
| 3 | truncated tetrahedron | t0,1{3,3} | {6} | {3} | 8 | 18 | 12 | |||
| [3] | Bitruncated tetrahedron (Same as truncated tetrahedron) | t1,2{3,3} | {3} | {6} | 8 | 18 | 12 | |||
| 4 | cantellated tetrahedron (Same as cuboctahedron) | t0,2{3,3} | {3} | {4} | {3} | 14 | 24 | 12 | ||
| 5 | omnitruncated tetrahedron (Same as truncated octahedron) | t0,1,2{3,3} | {6} | {4} | {6} | 14 | 36 | 24 | ||
| 6 | Snub tetrahedron (Same as icosahedron) | s{3,3} | {3} | 2 {3} | {3} | 20 | 30 | 12 | ||
The octahedral symmetry of the sphere generates 7 uniform polyhedra, and a 3 more by alternation. Four of these forms are repeated from the tetrahedral symmetry table above.
The octaahedral symmetry is represented by a fundamental triangle (4 3 2) counting the mirrors at each vertex. It can also be represented by the Coxeter group B2 or [4,3], as well as a Coxeter-Dynkin diagram: .
There are 48 triangles, visible in the faces of the disdyakis dodecahedron and alternately colored triangles on a sphere:
| # | Name | Picture | Tiling | Coxeter-Dynkin and Schläfli symbols | Face counts by position | Element counts | ||||
|---|---|---|---|---|---|---|---|---|---|---|
| Pos. 2 [4] (8) | Pos. 1 []x[] (6) | Pos. 0 [3] (12) | Faces | Edges | Vertices | |||||
| 7 | Cube | {4,3} | {4} | 6 | 12 | 8 | ||||
| [2] | Octahedron | {3,4} | {3} | 8 | 12 | 6 | ||||
| [4] | rectified cube rectified octahedron (Cuboctahedron) | {4,3} | {4} | {3} | 14 | 24 | 12 | |||
| 8 | Truncated cube | t0,1{4,3} | {8} | {3} | 14 | 36 | 24 | |||
| [5] | Truncated octahedron | t0,1{3,4} | {4} | {6} | 14 | 36 | 24 | |||
| 9 | Cantellated cube cantellated octahedron Rhombicuboctahedron | t0,2{4,3} | {8} | {4} | {6} | 26 | 48 | 24 | ||
| 10 | Omnitruncated cube omnitruncated octahedron Truncated cuboctahedron | t0,1,2{4,3} | {8} | {4} | {6} | 26 | 72 | 48 | ||
| [6] | Alternated truncated octahedron (Same as Icosahedron) | h0,1{3,4} | {3} | {3} | 20 | 30 | 12 | |||
| [1] | Alternated cube (Same as tetrahedron) | h{4,3} | 1/2 {3} | 6 | 12 | 8 | ||||
| 11 | Snub cube | s{4,3} | {4} | 2 {3} | {3} | 38 | 60 | 24 | ||
The icosahedral symmetry of the sphere generates 7 uniform polyhedra, and a 1 more by alternation. Only one is repeated from the tetrahedral and octahedral symmetry table above.
The icosahedral symmetry is represented by a fundamental triangle (5 3 2) counting the mirrors at each vertex. It can also be represented by the Coxeter group G2 or [5,3], as well as a Coxeter-Dynkin diagram: .
There are 60 triangles, visible in the faces of the disdyakis triacontahedron and alternately colored triangles on a sphere:
| # | Name | Picture | Tiling | Coxeter-Dynkin and Schläfli symbols | Face counts by position | Element counts | ||||
|---|---|---|---|---|---|---|---|---|---|---|
| Pos. 2 [5] (12) | Pos. 1 []x[] (30) | Pos. 0 [3] (20) | Faces | Edges | Vertices | |||||
| 12 | Dodecahedron | {5,3} | {5} | 12 | 30 | 20 | ||||
| [6] | Icosahedron | {3,5} | {3} | 20 | 30 | 12 | ||||
| 13 | Rectified dodecahedron Rectified icosahedron Icosidodecahedron | t1{5,3} | {5} | {3} | 32 | 60 | 30 | |||
| 14 | Truncated dodecahedron | t0,1{5,3} | {10} | {3} | 32 | 90 | 60 | |||
| 15 | Truncated icosahedron | t0,1{3,5} | {5} | {6} | 32 | 90 | 60 | |||
| 16 | Cantellated dodecahedron Cantellated icosahedron Rhombicosidodecahedron | t0,2{5,3} | {5} | {4} | {3} | 62 | 120 | 60 | ||
| 17 | Omnitruncated dodecahedron Omnitruncated icosahedron Truncated icosidodecahedron | t0,1,2{5,3} | {10} | {4} | {6} | 62 | 180 | 120 | ||
| 18 | Snub dodecahedron Snub icosahedron | s{5,3} | {5} | 2 {3} | {3} | 92 | 150 | 60 | ||
The dihedral symmetry of the sphere generates two infinite sets of uniform polyhedra, prisms and antiprisms, and two more infinite set of degenerate polygons, the hosohedrons and dihedrons which exists as tilings on the sphere.
The dihedral symmetry is represented by a fundamental triangle (p 2 2) counting the mirrors at each vertex. It can also be represented by the Coxeter group I2(p) or [n,2], as well as a prismatic Coxeter-Dynkin diagram: .
Below are the first five dihedral symmetries: D2 ... D6. The dihedral symmetry Dp has order 4n, represented the faces of a bipyramid, and on the sphere as an equator line on the longitude, and n equally-spaced lines of longitude.
There are 8 fundamental triangles, visible in the faces of the square bipyramid (Octahedron) and alternately colored triangles on a sphere:
| # | Name | Picture | Tiling | Coxeter-Dynkin and Schläfli symbols | Face counts by position | Element counts | ||||
|---|---|---|---|---|---|---|---|---|---|---|
| Pos. 2 [2] (2) | Pos. 1 []x[] (2) | Pos. 0 []x[] (2) | Faces | Edges | Vertices | |||||
| D2 H2 | digonal dihedron digonal hosohedron | {2,2} | {2} | 2 | 2 | 2 | ||||
| D4 | truncated digonal dihedron (Same as square dihedron) | t{2,2}={4,2} | {4} | 2 | 4 | 4 | ||||
| P4 [7] | omnitruncated digonal dihedron (Same as cube) | t0,1,2{2,2} | {4} | {4} | {4} | 6 | 12 | 8 | ||
| A2 [1] | snub digonal dihedron (Same as tetrahedron) | s{2,2} | {3} | {3} | 4 | 6 | 4 | |||
There are 12 fundamental triangles, visible in the faces of the hexagonal bipyramid and alternately colored triangles on a sphere:
| # | Name | Picture | Tiling | Coxeter-Dynkin and Schläfli symbols | Face counts by position | Element counts | ||||
|---|---|---|---|---|---|---|---|---|---|---|
| Pos. 2 [3] (2) | Pos. 1 []x[] (3) | Pos. 0 []x[] (3) | Faces | Edges | Vertices | |||||
| D3 | Trigonal dihedron | {3,2} | {3} | 2 | 3 | 3 | ||||
| H3 | Trigonal hosohedron | {2,3} | {2} | 3 | 3 | 2 | ||||
| D6 | Truncated trigonal dihedron (Same as hexagonal dihedron) | t{3,2} | {6} | 2 | 6 | 6 | ||||
| P3 | Truncated trigonal hosohedron (Triangular prism) | t{2,3} | {3} | {4} | 5 | 9 | 6 | |||
| P6 | Omnitruncated trigonal dihedron (Hexagonal prism) | t{2,3} | {6} | {4} | {4} | 8 | 18 | 12 | ||
| A3 [2] | Snub trigonal dihedron (Same as Triangular antiprism) (Same as octahedron) | s{2,3} | {3} | {3} | {3} | 8 | 12 | 6 | ||
There are 16 fundamental triangles, visible in the faces of the octagonal bipyramid and alternately colored triangles on a sphere:
| # | Name | Picture | Tiling | Coxeter-Dynkin and Schläfli symbols | Face counts by position | Element counts | ||||
|---|---|---|---|---|---|---|---|---|---|---|
| Pos. 2 [4] (2) | Pos. 1 []x[] (4) | Pos. 0 []x[] (4) | Faces | Edges | Vertices | |||||
| D4 | square dihedron | {4,2} | {4} | 2 | 4 | 4 | ||||
| H4 | square hosohedron | {2,4} | {2} | 4 | 4 | 2 | ||||
| D8 | Truncated square dihedron (Same as octagonal dihedron) | t{4,2} | {8} | 2 | 8 | 8 | ||||
| P4 [7] | Truncated square hosohedron (Cube) | t{2,4} | {4} | {4} | 6 | 12 | 8 | |||
| D8 | Omnitruncated square dihedron (Octagonal prism) | t{2,4} | {8} | {4} | {4} | 10 | 24 | 16 | ||
| A4 | Snub square dihedron (Square antiprism) | t{2,4} | {4} | {3} | {3} | 10 | 16 | 8 | ||
There are 20 fundamental triangles, visible in the faces of the decagonal bipyramid and alternately colored triangles on a sphere:
| # | Name | Picture | Tiling | Coxeter-Dynkin and Schläfli symbols | Face counts by position | Element counts | ||||
|---|---|---|---|---|---|---|---|---|---|---|
| Pos. 2 [5] (2) | Pos. 1 []x[] (5) | Pos. 0 []x[] (5) | Faces | Edges | Vertices | |||||
| D5 | Pentagonal dihedron | {5,2} | {5} | 2 | 5 | 5 | ||||
| H5 | Pentagonal hosohedron | {2,5} | {2} | 5 | 5 | 2 | ||||
| D10 | Truncated pentagonal dihedron (Same as decagonal dihedron) | t{5,2} | {10} | 2 | 10 | 10 | ||||
| P5 | Truncated pentagonal hosohedron (Same as pentagonal prism) | t{2,5} | {5} | {4} | 7 | 15 | 10 | |||
| P10 | Omnitruncated pentagonal dihedron (Decagonal prism) | t{2,5} | {10} | {4} | {4} | 12 | 30 | 20 | ||
| A5 | Snub pentagonal dihedron (Pentagonal antiprism) | t{2,5} | {5} | {3} | {3} | 12 | 20 | 10 | ||
There are 24 fundamental triangles, visible in the faces of the dodecagonal bipyramid and alternately colored triangles on a sphere.
| # | Name | Picture | Tiling | Coxeter-Dynkin and Schläfli symbols | Face counts by position | Element counts | ||||
|---|---|---|---|---|---|---|---|---|---|---|
| Pos. 2 [6] (2) | Pos. 1 []x[] (6) | Pos. 0 []x[] (6) | Faces | Edges | Vertices | |||||
| D6 | Hexagonal dihedron | {6,2} | {6} | 2 | 6 | 6 | ||||
| H6 | Hexagonal hosohedron | {2,6} | {2} | 6 | 6 | 2 | ||||
| D12 | Truncated hexagonal dihedron (Same as dodecagonal dihedron) | t{6,2} | {12} | 2 | 12 | 12 | ||||
| H6 | Truncated hexagonal hosohedron (Same as hexagonal prism) | t{2,6} | {6} | {4} | 8 | 18 | 12 | |||
| P12 | Omnitruncated hexagonal dihedron (Dodecagonal prism) | t{2,6} | {12} | {4} | {4} | 14 | 36 | 24 | ||
| A6 | Snub hexagonal dihedron (Hexagonal antiprism) | t{2,6} | {6} | {3} | {3} | 14 | 24 | 12 | ||
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