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 on a topologically mixing subshift of finite type endowed itself with a metric associated with such a potential. We work without additional regularity assumption other than continuity. Our approach differs from those used previously to deal with this question under stronger assumptions on the potentials. As a consequence, it provides a new description of the structure of the spectrum in terms of {\it weak} concavity. Also, the lower bound for the spectrum is obtained as a consequence of the study sets of points at which the asymptotic behavior of is localized, i.e. depends on the point rather than being equal to a constant. Specifically, we compute the Hausdorff dimension of sets of the form , where is a given continuous function. This has interesting geometric applications to fixed points in the asymptotic average for dynamical systems in , as well as the fine local behavior of the harmonic measure on conformal planar Cantor sets.
Cite
@article{arxiv.1104.1442,
title = {Localized asymptotic behavior for almost additive potentials},
author = {Julien Barral and Yan-Hui Qu},
journal= {arXiv preprint arXiv:1104.1442},
year = {2011}
}