Total curvature

In mathematical study of the differential geometry of curves, the total curvature of a plane curve is the integral of curvature along a curve taken with respect to arclength:

:$int\_a^b\; k(s),ds.$

The total curvature of a closed curve is always an integer multiple of 2π, called the index of the curve; it is the winding number of the unit tangent about the origin. This relationship between a local invariant, the curvature, and a global topological invariant, the index, is characteristic of results in higher-dimensional Riemannian geometry such as the Gauss-Bonnet theorem.

The total curvature of a curve γ in a higher dimensional Euclidean space (equipped with its arclength parameterization) can be obtained by flattening out the tangent developable to γ into a plane, and computing the total curvature of the resulting curve. That is, the total curvature of a curve in "n"-dimensional space is

:$int\_a^b\; left|gamma"(s)\; ight|sgn\; kappa\_\{n-1\}(s),ds$

where κ_"n"−1 is last Frenet curvature (the torsion of the curve) and sgn is the signum function.

According to the Whitney-Graustein theorem, the total curvature is invariant under a regular homotopy of a curve.

References

*citation|first= Wolfgang|last=Kuhnel|title=Differential Geometry: Curves - Surfaces - Manifolds|publisher=American Mathematical Society|year=2005|edition=2nd|isbn=978-0821839881 (translated by Bruce Hunt)
*citation|title=On the Total Curvature of Knots|first=John W.|last=Milnor|authorlink=John Milnor|journal=The Annals of Mathematics, Second Series|volume=52|number=2|year=1950|pages=248-257|url=http://www.jstor.org/stable/1969467