Topological stability and Gromov hyperbolicity
Copyright policy ) Ruggiero, Rafael Oswaldo;
Topological stability and Gromov hyperbolicity
We show that if the geodesic flow of a compact analytic Riemannian manifold $M$ of non-positive curvature is either $C^{k}$-topologically stable or satisfies the $\epsilon$-$C^{k}$-shadowing property for some $k > 0$ then the universal covering of $M$ is a Gromov hyperbolic space. The same holds for compact surfaces without conjugate points.
Geodesic flows in symplectic geometry and contact geometry, Dynamical systems of geometric origin and hyperbolicity (geodesic and horocycle flows, etc.)
Geodesic flows in symplectic geometry and contact geometry, Dynamical systems of geometric origin and hyperbolicity (geodesic and horocycle flows, etc.)
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These citations are derived from selected sources.
This is an alternative to the "Influence" indicator, which also reflects the overall/total impact of an article in the research community at large, based on the underlying citation network (diachronically).
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This indicator reflects the "current" impact/attention (the "hype") of an article in the research community at large, based on the underlying citation network.
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