Multifractal analysis of weak Gibbs measures for non-uniformly expanding C^1 maps

Details Multifractal analysis of weak Gibbs measures for non-uniformly expanding C^1 maps Multifractal analysis of weak Gibbs measures for non-uniformly expanding C^1 maps

2008-06-04

arxiv.org/abs/0806.0727v3

Mathematics

Dynamical Systems

New version, main changes: the results hold for continuous potentials (previously: Holder potentials) and C^1 maps (previously

Scientific paper

We consider the local dimension spectrum of a weak Gibbs measure on a C^1 non-uniformly hyperbolic system of Manneville- Pomeau type. We present the spectrum in three ways: using invariant measures, uniformly hyperbolic ergodic measures and equilibrium states. We are also proving analyticity of the spectrum under additional assumptions. All three presentations are well known for smooth uniformly hyperbolic systems.

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