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Paper detail

Focal Rigidity of Flat Tori

Given a closed Riemannian manifold (M, g), there is a partition Σ_i of its tangent bundle TM called the focal decomposition. The sets Σ_i are closely associated to focusing of geodesics of (M, g), i.e. to the situation where there are exactly i geodesic arcs of the same length joining points p and q in M. In this note, we study the topological structure of the focal decomposition of a closed Riemannian manifold and its relation with the metric structure of the manifold. Our main result is that the flat n-tori are focally rigid, in the sense that if two flat tori are focally equivalent, then the tori are isometric up to rescaling.

preprint2011arXivOpen access
Ferry KwakkelMarco MartensMauricio Peixoto
math.DG
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Ferry KwakkelMarco MartensMauricio Peixoto

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