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Existence of quasigeodesic Anosov flows in hyperbolic 3-manifolds

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Resumen: A quasigeodesic in a manifold is a curve so that when lifted to the universal cover is uniformly efficient up to a bounded multiplicative and added error in measuring length. A flow is quasigeodesic if all flow lines are  quasigeodesics. We prove that an Anosov flow in a closed hyperbolic manifold is quasigeodesic if and only if it is not R-covered. Here R-covered means that the stable 2-dim foliation of the flow, lifts to a foliation in the universal cover whose leaf space is homeomorphic to the real numbers. There are many examples of quasigeodesic Anosov flows in closed hyperbolic 3-manifolds. There are consequences for the continuous extension property of Anosov foliations, and the existence of group invariant Peano curves associated with Anosov flows.


Viernes 1/3 a las 15:30
Salón 703 (Rojo) FING

Contacto: Santiago Martinchich y Luis Pedro Piñeyrúa - santiago.martinchich [at] fcea.edu.uy (santiago[dot]martinchich[at]fcea[dot]edu.uy)


Vuelve el seminario de dinámica! Sesión doble Barbot + Fenley.

Notar que excepcionalmente este viernes comienza a las 14:00 y el salón es el 703 (Rojo).