Möbius geometry

E581257

Möbius geometry is a branch of geometry that studies properties of figures invariant under Möbius (conformal) transformations of the extended complex plane or higher-dimensional spheres.

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Möbius geometry canonical 1

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Predicate Object
instanceOf branch of geometry
conformal geometry
appliesTo boundaries of hyperbolic spaces
extended complex plane
n-dimensional spheres
basedOn conformal maps of the Riemann sphere
fractional linear transformations
characterizedBy action of Möbius group on the sphere
angle preservation
mapping circles and lines to circles and lines
concerns classification of Möbius transformations
global properties of conformal maps
invariants under conformal transformations
developedFrom complex function theory
projective geometry of the line and circle
fieldOfStudy Möbius transformations NERFINISHED
extended complex plane
higher-dimensional spheres
hasApplicationIn computer graphics
conformal mapping in engineering
discrete groups of isometries
geometric function theory
hyperbolic 3-manifolds
hasInvariant angles between curves
cross-ratio of four points
hasKeyConcept Möbius group NERFINISHED
Riemann sphere NERFINISHED
circle inversions
circles and lines as generalized circles
conformal structure
cross-ratio
sphere inversions
stereographic projection
namedAfter August Ferdinand Möbius NERFINISHED
relatedTo Kleinian groups NERFINISHED
Riemann surfaces NERFINISHED
conformal geometry
hyperbolic geometry
inversive geometry
studies circle-preserving transformations
conformal properties of figures
properties invariant under Möbius transformations
sphere-preserving transformations
uses complex analysis
differential geometry NERFINISHED
group theory
projective geometry

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Lie sphere geometry relatedTo Möbius geometry