1. Local boundary rigidity of a compact Riemannian manifold with curvature bounded above
- Author
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Christopher B. Croke, Vladimir Sharafutdinov, and Nurlan S. Dairbekov
- Subjects
Closed manifold ,Applied Mathematics ,General Mathematics ,Prescribed scalar curvature problem ,Mathematical analysis ,Fundamental theorem of Riemannian geometry ,Riemannian manifold ,Pseudo-Riemannian manifold ,Combinatorics ,symbols.namesake ,symbols ,Minimal volume ,Exponential map (Riemannian geometry) ,Scalar curvature ,Mathematics - Abstract
This paper considers the boundary rigidity problem for a compact convex Riemannian manifold ( M , g ) (M,g) with boundary ∂ M \partial M whose curvature satisfies a general upper bound condition. This includes all nonpositively curved manifolds and all sufficiently small convex domains on any given Riemannian manifold. It is shown that in the space of metrics g ′ g’ on M M there is a C 3 , α C^{3,\alpha } -neighborhood of g g such that g g is the unique metric with the given boundary distance-function (i.e. the function that assigns to any pair of boundary points their distance — as measured in M M ). More precisely, given any metric g ′ g’ in this neighborhood with the same boundary distance function there is diffeomorphism φ \varphi which is the identity on ∂ M \partial M such that g ′ = φ ∗ g g’=\varphi ^{*}g . There is also a sharp volume comparison result for metrics in this neighborhood in terms of the boundary distance-function.
- Published
- 2000
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