Uniqueness for antipodal points of maximum distance on closed convex surface

Take two copies of an equilateral triangle $ABC$ and glue them along their boundary. The resulting surface is homeomorphic to the sphere. The metric is convex. Then both $B$ and $C$ are at maximal distance from $A$ so $B$ is not the unique point at maximal distance from $A$.

Tags:

Riemannian Geometry

Differential Geometry

Surfaces

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