Schwarz triangle

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In mathematics, a Schwarz triangle is a spherical triangle that can be used to tile a sphere. Each Schwarz triangle defines a finite group — its triangle group.

A Schwarz triangle is represented by three rational numbers (a b c) each representing the angle at a vertex. A n/d value means the vertex angle is d/n of the circle. If it has a 2 means a right triangle.

For whole numbers there are only 4 groups, also called Mobius triangles:

(2 2 p) - Dihedral
(2 3 3) - Tetrahedral
(2 3 4) - Octahedral
(2 3 5) - Icosahedral

1 A complete list of Schwarz triangles grouped by symmetry
2 See also
3 References
4 External links

[edit] A complete list of Schwarz triangles grouped by symmetry

There are four families of Schwarz triangles based on their symmetry.

Dihedral symmetry - {}x{n}
- Right: (2 2 n)
Tetrahedral symmetry - {3,3}
- Right: (2 3 3), (2 ³/₂ 3), (2 ³/₂ ³/₂)
- Others: (³/₂ 3 3), (³/₂ ³/₂ ³/₂)
Octahedral symmetry - {3,4}
- Right: (2 3 4), (2 ³/₂ 4), (2 3 ⁴/₃), (2 ³/₂ ⁴/₃)
- Others: (³/₂ 4 4), (3 ⁴/₃ 4), (³/₂ ⁴/₃ ⁴/₃)
Icosahedral symmetry - {3,5}
- Right: (2 3 5), (2 ³/₂ 5), (2 3 ⁵/₄), (2 ³/₂ ⁵/₄)
  - (2 ⁵/₂ 5), (2 ⁵/₃ 5), (2 ⁵/₂ ⁵/₄), (2 ⁵/₃ ⁵/₄)
  - (2 ⁵/₂ 3), (2 ⁵/₃ 3), (2 ⁵/₂ ³/₂), (2 ⁵/₃ ³/₂)
- Others: (⁵/₂ 3 3), (⁵/₃ ³/₂ 3), (⁵/₂ ³/₂ ³/₂)
  - (³/₂ 5 5), (3 ⁵/₄ 5), (³/₂ ⁵/₄ ⁵/₄)
  - (⁵/₂ ⁵/₂ ⁵/₂), (⁵/₃ ⁵/₃ ⁵/₂)
  - (³/₂ 3 5), (3 3 ⁵/₄), (³/₂ ³/₂ ⁵/₄)
  - (⁵/₄ 5 5), (⁵/₄ ⁵/₄ ⁵/₄)
  - (⁵/₃ ⁵/₂ 3), (⁵/₂ ⁵/₂ ³/₂), (⁵/₃ ⁵/₃ ³/₂)