Farey tessellation

E169192

The Farey tessellation is a geometric partition of the hyperbolic plane into ideal triangles whose vertices correspond to rational numbers, closely linked to number theory and modular group actions.

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All labels observed (2)

Label Occurrences
Farey graph 2
Farey tessellation canonical 1

Statements (49)

Predicate Object
instanceOf geometric tessellation
hyperbolic tessellation
ideal triangulation
object in hyperbolic geometry
object in number theory
appearsIn Teichmüller theory
hyperbolic 2-orbifolds
study of mapping class groups of surfaces
boundaryIdentifiedWith projective line over Q
constructedFrom geodesics between pairs of rational points on the real line and infinity
definedOn hyperbolic plane
edgeConnects fractions a/c and b/d with |ad − bc| = 1
embeddedIn Poincaré upper half-plane model
encodes adjacency of rationals in Farey sequences
mediant operation on fractions
generalizedBy tessellations associated to other Fuchsian groups
hasCombinatorialStructure infinite planar triangulation
hasCurvatureContext constant negative curvature
hasDualObject Farey tessellation self-linksurface differs
surface form: Farey graph
hasEdgeType hyperbolic geodesic
hasFaceType ideal triangle
hasFundamentalDomain ideal triangle with vertices 0,1,∞
hasSymmetryGroup modular group PSL(2,Z)
surface form: PSL(2,Z)
hasVertex 0
1
hasVertexSet extended rational numbers
rational numbers union infinity
induces triangulation of the boundary circle by rationals
isInvariantUnder group SL(2,Z) acting projectively
modular group PSL(2,Z)
isLocallyFinite false
mathematicalDomain hyperbolic geometry
number theory
namedAfter John Farey Sr.
surface form: John Farey
relatedTo Farey sequence
Ford circles
Stern–Brocot tree
continued fractions
geodesics in the modular surface
modular group
modular surface
rational approximations
usedIn Diophantine approximation
coding of geodesic flows
study of Fuchsian groups
study of modular forms
symbolic dynamics on the modular surface
visualizedIn Poincaré upper half-plane model
surface form: Poincaré disk model

Referenced by (3)

Full triples — surface form annotated when it differs from this entity's canonical label.

Conway’s topograph relatedTo Farey tessellation
Conway’s topograph inspiredBy Farey tessellation
this entity surface form: Farey graph
Farey tessellation hasDualObject Farey tessellation self-linksurface differs
this entity surface form: Farey graph