Cohn-Vossen's inequality

In differential geometry, Cohn-Vossen's inequality, named after Stefan Cohn-Vossen, relates the integral of Gaussian curvature of a non-compact surface to the Euler characteristic. It is akin to the Gauss–Bonnet theorem for a compact surface.

A divergent path within a Riemannian manifold is a smooth curve in the manifold that is not contained within any compact subset of the manifold. A complete manifold is one in which every divergent path has infinite length with respect to the Riemannian metric on the manifold. Cohn-Vossen's inequality states that in every complete Riemannian 2-manifold S with finite total curvature and finite Euler characteristic, we have[1]

\iint _{S}K\,dA\leq 2\pi \chi (S),

where K is the Gaussian curvature, dA is the element of area, and χ is the Euler characteristic.

Examples

If S is a compact surface (without boundary), then the inequality is an equality by the usual Gauss–Bonnet theorem for compact manifolds.
If S has a boundary, then the Gauss–Bonnet theorem gives

\iint _{S}K\,dA=2\pi \chi (S)-\int _{\partial S}k_{g}\,ds

where

k_{g}

is the geodesic curvature of the boundary, and its integral the total curvature which is necessarily positive for a boundary curve, and the inequality is strict. (A similar result holds when the boundary of S is piecewise smooth.)

If S is the plane R², then the curvature of S is zero, and χ(S) = 1, so the inequality is strict: 0 < 2 $π$ .

Notes and references

Robert Osserman, A Survey of Minimal Surfaces, Courier Dover Publications, 2002, page 86.

S. E. Cohn-Vossen, Some problems of differential geometry in the large, Moscow (1959) (in Russian)

External links

Gauss–Bonnet theorem, in the Encyclopedia of Mathematics, including a brief account of Cohn-Vossen's inequality

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[1] Robert Osserman, A Survey of Minimal Surfaces, Courier Dover Publications, 2002, page 86.