Multifractal analysis and localized asymptotic behavior for almost additive potentials

Abstract

We conduct the multifractal analysis of the level sets of the asymptotic behavior of almost-additive continuous potentials (φn)n=1∞ on a topologically mixing subshift of finite type X endowed itself with a metric associated with such a potential. We work without bounded distorsion property assumption. We express the whole Hausdorff spectrum in terms of a conditional variational principle, as well as a new large deviations principle. Our approach provides a new description of the structure of the spectrum in terms of weak concavity. Another new point is that we consider sets of points at which the asymptotic behavior of φn(x) is localized, i.e. depends on the point x rather than being equal to a constant. Specifically, we compute the Hausdorff dimension of sets of the form \x∈ X: n∞ φn(x)/n=(x)\, where is a given continuous function. This is naturally related to Birkhoff's ergodic theorem and has interesting geometric applications to fixed points in the asymptotic average for dynamical systems in d, as well as the fine local behavior of the harmonic measure on conformal planar Cantor sets.