Dehn lemma

E265412

The Dehn lemma is a fundamental result in 3-manifold topology that gives conditions under which a loop on the boundary of a 3-manifold bounds an embedded disk in the manifold.

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Label Occurrences
Dehn lemma canonical 3

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Statements (47)

Predicate Object
instanceOf result in 3-manifold topology
theorem in topology
appliesTo compact 3-manifolds
orientable 3-manifolds
assumption loop has a map of a disk into the manifold with boundary that loop
loop on the boundary is null-homotopic in the 3-manifold
category low-dimensional topology theorem
concerns 3-manifolds
embedded disks
loops on the boundary of 3-manifolds
null-homotopic curves on the boundary
conclusion there exists an embedded disk in the manifold with the same boundary loop
field 3-manifold topology
geometric topology
topology
gapRepairedBy Christos Papakyriakopoulos
givesConditionFor when a loop on the boundary of a 3-manifold bounds an embedded disk
implies existence of an embedded disk with given boundary under certain conditions
influenced development of 3-manifold topology in the mid-20th century
work of Friedhelm Waldhausen
work of John Stallings
involvesConcept boundary of a manifold
embedded surfaces
immersed disks
null-homotopy
isPartOf classical results in low-dimensional topology
modernProofBy Christos Papakyriakopoulos
namedAfter Max Dehn
oftenStatedWith loop theorem
originallyProvedBy Max Dehn
originalProof contained a gap
proofMethod use of group-theoretic techniques in topology
use of towers of covering spaces
publishedIn Annals of Mathematics
relatedTo Haken manifolds
Poincaré conjecture
incompressible surfaces
loop theorem
sphere theorem
strengthenedBy loop theorem
typeOfResult existence theorem
usedIn 3-manifold decomposition theory
construction of incompressible surfaces
knot theory
proofs of the loop theorem
study of fundamental groups of 3-manifolds
yearOfCorrectProof 1957

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Referenced by (3)

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

Max Dehn notableWork Dehn lemma
Max Dehn notableConcept Dehn lemma
Max Dehn hasEponym Dehn lemma