A variational principle for systems with nonuniformly hyperbolic behavior with applications to the dimension theory

Abstract

Let f be a C1+α nonuniformly hyperbolic diffeomorphism. We use a a nonadditive version of the topological pressure of a class of admissible, possibly noncontinuous potentials P*() to prove the following variational equation: P*() = ∈ HP*(f|,) supremum taken over the set H of basic subsets in M. As a consequence we find a lower bound for the Cantor dimension of the stable and unstable Cantor sets of a non trivial conformal nonuniformly hyperbolic isolated sets.