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Mathematical Research Letters

Volume 12, Issue 3, May 2005  pp. 425-441.

On Uniformly Quasiconformal Anosov Systems

Authors Victoria Sadovskaya
Author institution: University of South Alabama

Summary:  We show that for any uniformly quasiconformal symplectic Anosov diffeomorphism of a compact manifold of dimension at least 4, its finite cover is $C^\infty$ conjugate to an Anosov automorphism of a torus. We also prove that any uniformly quasiconformal contact Anosov flow on a compact manifold of dimension at least 5 is essentially $C^\infty$ conjugate to the geodesic flow of a manifold of constant negative curvature.


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