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Curvature

In mathematics, curvature is any of several strongly related concepts in geometry that intuitively measure the amount by which a curve deviates from being a straight line or by which a surface deviates from being a plane. If a curve or surface is contained in a larger space, curvature can be defined extrinsically relative to the ambient space. Curvature of Riemannian manifolds of dimension at least two can be defined intrinsically without reference to a larger space.

This article is about mathematics and related concepts in geometry. For other uses, see Curvature (disambiguation).

For curves, the canonical example is that of a circle, which has a curvature equal to the reciprocal of its radius. Smaller circles bend more sharply, and hence have higher curvature. The curvature at a point of a differentiable curve is the curvature of its osculating circle — that is, the circle that best approximates the curve near this point. The curvature of a straight line is zero. In contrast to the tangent, which is a vector quantity, the curvature at a point is typically a scalar quantity, that is, it is expressed by a single real number.


For surfaces (and, more generally for higher-dimensional manifolds), that are embedded in a Euclidean space, the concept of curvature is more complex, as it depends on the choice of a direction on the surface or manifold. This leads to the concepts of maximal curvature, minimal curvature, and mean curvature.

normal curvature

geodesic curvature

geodesic torsion

for the appropriate notion of curvature for vector bundles and principal bundles with connection

Curvature form

for a notion of curvature in measure theory

Curvature of a measure

Curvature of parametric surfaces

for generalizations of Gauss curvature to higher-dimensional Riemannian manifolds

Curvature of Riemannian manifolds

and geodesic curvature for appropriate notions of curvature of curves in Riemannian manifolds, of any dimension

Curvature vector

Degree of curvature

for a full treatment of curves embedded in a Euclidean space of arbitrary dimension

Differential geometry of curves

a measurement of curvature used in optics

Dioptre

the locus of the centers of curvature of a given curve

Evolute

Fundamental theorem of curves

for an elementary application of curvature

Gauss–Bonnet theorem

for more geometric properties of Gauss curvature

Gauss map

an expression of the Principle of Least Action

Gauss's principle of least constraint

at one point on a surface

Mean curvature

Minimum railway curve radius

Radius of curvature

for the extrinsic curvature of hypersurfaces in general

Second fundamental form

Sinuosity

Torsion of a curve

(June 1952). "The Unsatisfactory Story of Curvature". American Mathematical Monthly. 59 (6): 375–379. doi:10.2307/2306807. JSTOR 2306807.

Coolidge, Julian L.

Sokolov, Dmitriĭ Dmitrievich (2001) [1994], , Encyclopedia of Mathematics, EMS Press

"Curvature"

(1998). Calculus: An Intuitive and Physical Approach. Dover. pp. 457–461. ISBN 978-0-486-40453-0. (restricted online copy, p. 457, at Google Books)

Kline, Morris

Klaf, A. Albert (1956). . Dover. pp. 151–168. ISBN 978-0-486-20370-6. (restricted online copy , p. 151, at Google Books)

Calculus Refresher

Casey, James (1996). Exploring Curvature. Vieweg+Teubner.  978-3-528-06475-4.

ISBN

The Feynman Lectures on Physics Vol. II Ch. 42: Curved Space

The History of Curvature

at MathPages

Curvature, Intrinsic and Extrinsic