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Uniform tiling symmetry mutations
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In geometry, a symmetry mutation is a mapping of fundamental domains between two symmetry groups.[1] They are compactly expressed in orbifold notation. These mutations can occur from spherical tilings to Euclidean tilings to hyperbolic tilings. Hyperbolic tilings can also be divided between compact, paracompact and divergent cases.
More information Spherical tilings (n = 3..5), Euclidean plane tiling (n = 6) ...
Spherical tilings (n = 3..5) | ||
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![]() *332 |
![]() *432 |
![]() *532 |
Euclidean plane tiling (n = 6) | ||
![]() *632 | ||
Hyperbolic plane tilings (n = 7...∞) | ||
![]() *732 |
![]() *832 |
![]() ... *∞32 |
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The uniform tilings are the simplest application of these mutations, although more complex patterns can be expressed within a fundamental domain.
This article expressed progressive sequences of uniform tilings within symmetry families.