Geometry of expanding absolutely continuous invariant measures and the
  liftability problem

Alves, José F.; Luzzatto, Stefano; Dias, Carla L.

doi:10.1016/j.anihpc.2012.06.004

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Geometry of expanding absolutely continuous invariant measures and the liftability problem

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Author(s): José F. Alves, Stefano Luzzatto, Carla Dias

Publication date: 2012-11-06

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Abstract

We show that for a large class of maps on manifolds of arbitrary finite dimension, the existence of a Gibbs-Markov-Young structure (with Lebesgue as the reference measure) is a necessary as well as sufficient condition for the existence of an invariant probability measure which is absolutely continuous measure (with respect to Lebesgue) and for which all Lyapunov exponents are positive.

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Most cited references 15

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An Introduction to Ergodic Theory

Peter Walters (1982)

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Thermodynamic formalism for countable Markov shifts

OMRI SARIG (1999)

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Almost Sure Invariance Principle For Nonuniformly Hyperbolic Systems

Matthew Nicol, Ian Melbourne (2005)

We prove an almost sure invariance principle that is valid for general classes of nonuniformly expanding and nonuniformly hyperbolic dynamical systems. Discrete time systems and flows are covered by this result. In particular, the result applies to the planar periodic Lorentz flow with finite horizon. Statistical limit laws such as the central limit theorem, the law of the iterated logarithm, and their functional versions, are immediate consequences.