Geodesic convexity

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In mathematics — specifically, in Riemannian geometrygeodesic convexity is a natural generalization of convexity for sets and functions to Riemannian manifolds. It is common to drop the prefix "geodesic" and refer simply to "convexity" of a set or function.

Definitions

Let (Mg) be a Riemannian manifold.

  • A subset C of M is said to be a geodesically convex set if, given any two points in C, there is a unique minimizing geodesic contained within C that joins those two points.
  • Let C be a geodesically convex subset of M. A function [math]\displaystyle{ f:C\to\mathbf{R} }[/math] is said to be a (strictly) geodesically convex function if the composition
[math]\displaystyle{ f \circ \gamma : [0, T] \to \mathbf{R} }[/math]
is a (strictly) convex function in the usual sense for every unit speed geodesic arc γ : [0, T] → M contained within C.

Properties

  • A geodesically convex (subset of a) Riemannian manifold is also a convex metric space with respect to the geodesic distance.

Examples

  • A subset of n-dimensional Euclidean space En with its usual flat metric is geodesically convex if and only if it is convex in the usual sense, and similarly for functions.
  • The "northern hemisphere" of the 2-dimensional sphere S2 with its usual metric is geodesically convex. However, the subset A of S2 consisting of those points with latitude further north than 45° south is not geodesically convex, since the minimizing geodesic (great circle) arc joining two distinct points on the southern boundary of A leaves A (e.g. in the case of two points 180° apart in longitude, the geodesic arc passes over the south pole).

References

  • Rapcsák, Tamás (1997). Smooth nonlinear optimization in Rn. Nonconvex Optimization and its Applications. 19. Dordrecht: Kluwer Academic Publishers. ISBN 0-7923-4680-7. 
  • Udriste, Constantin (1994). Convex functions and optimization methods on Riemannian manifolds. Mathematics and its Applications. 297. Dordrecht: Kluwer Academic Publishers. ISBN 0-7923-3002-1. 




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