Weingarten map

E164383

The Weingarten map is a differential geometric operator on a surface that encodes how the surface’s normal vector field changes, thereby describing the surface’s extrinsic curvature.

All labels observed (1)

Label Occurrences
Weingarten map canonical 1

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Statements (46)

Predicate Object
instanceOf differential geometric operator
linear map
shape operator
actsOn tangent space of a surface
alsoKnownAs shape operator
appearsIn Gauss–Codazzi equations
theory of hypersurfaces in space forms
appliesTo oriented hypersurfaces
oriented surfaces
category linear operators in differential geometry
codomain tangent space of a surface at a point
context extrinsic geometry of submanifolds
definedAs S(X) = -∇_X n where n is the unit normal
definedFor hypersurfaces in Riemannian manifolds
regular surfaces in Euclidean space
dependsOn choice of unit normal field
determinantRelation determinant equals Gauss curvature for surfaces in R^3
domain tangent space of a surface at a point
eigenvalues principal curvatures
eigenvectors principal directions
encodes extrinsic curvature of a surface
variation of the unit normal vector field
fieldOfStudy Riemannian geometry
differential geometry
surface theory
generalizationOf curvature of plane curves to higher dimensions
introducedBy Julius Weingarten
invariantUnder isometries of the ambient Euclidean space
mathematicalDefinition negative of the differential of the Gauss map
namedAfter Julius Weingarten
property diagonalizable over the reals for regular surfaces
self-adjoint with respect to the induced metric
relatedConcept Gauss map
normal bundle
second fundamental form matrix
relatedTo Gauss curvature
mean curvature
second fundamental form
requires Levi-Civita connection of the ambient space
symbol A
S
traceRelation trace equals 2 times mean curvature for surfaces in R^3
usedFor classifying points as elliptic hyperbolic or parabolic
computing curvature invariants
studying stability of minimal surfaces
yearOfIntroduction 19th century

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Referenced by (1)

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

Gauss map relatedConcept Weingarten map