Smale’s paradox

E398343

Smale’s paradox is a result in differential topology showing that a sphere can be turned inside out in three-dimensional space through smooth deformations without tearing or creasing, challenging intuitive notions of geometry.

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Smale’s paradox canonical 1

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Statements (42)

Predicate Object
instanceOf mathematical theorem
result in differential topology
allows temporary self-intersections of the sphere
ambientSpace three-dimensional Euclidean space
category smooth category
clarifies difference between topological and geometric intuition
contrastsWith intuitive rigidity of the sphere in three dimensions
dimensionOfAmbientSpace 3
dimensionOfSurface 2
field differential topology
geometric topology
forbids creating sharp creases
pinching the surface to a point and cutting
tearing of the surface
hasConsequence classification of immersions of S^2 in R^3 up to regular homotopy
hasVisualization computer-generated sphere eversions
sphere eversion movies
implies any two immersions of S^2 in R^3 are regularly homotopic
inspired research on explicit sphere eversions
involvesConcept homotopy of immersions
immersed surfaces
regular homotopy
self-intersection
smooth deformation
sphere eversion
involvesObject 2-sphere
isAbout possibility of turning a sphere inside out smoothly
isCounterintuitive true
mainClaim a 2-sphere can be turned inside out in three-dimensional space by a smooth regular homotopy
a sphere eversion is possible without tearing or creating creases
namedAfter Stephen Smale
nonIntuitiveAspect inside and outside of a sphere are not topologically distinguished by smooth immersions in R^3
provedBy Stephen Smale
relatedConcept regular homotopy classes of immersions of S^2 in R^3
relatedResult Smale–Hirsch immersion theorem
relatedTo eversion of higher-dimensional spheres
requires smooth structure on Euclidean 3-space
smooth structure on the sphere
status mathematically proven
usesMethod differential-topological techniques
homotopy-theoretic arguments
yearProved 1958

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

Stephen Smale notableWork Smale’s paradox