Entropy along expanding foliations
Abstract
The (measure-theoretical) entropy of a diffeomorphism along an expanding invariant foliation is the rate of complexity generated by the diffeomorphism along the leaves of the foliation. We prove that this number varies upper semi-continuously with the diffeomorphism ( topology), the invariant measure (weak* topology) and the foliation itself in a suitable sense. This has several important consequences. For one thing, it implies that the set of Gibbs -states of partially hyperbolic diffeomorphisms is an upper semi-continuous function of the map in the topology. Another consequence is that the sets of partially hyperbolic diffeomorphisms with mostly contracting or mostly expanding center are open. New examples of partially hyperbolic diffeomorphisms with mostly expanding center are provided, and the existence of physical measures for residual subset of diffeomorphisms are discussed. We also provide a new class of robustly transitive diffeomorphisms: every volume preserving, accessible partially hyperbolic diffeomorphism with one dimensional center and non-vanishing center exponent is robustly transitive (among neighborhood of diffeomorphisms which are not necessarily volume preserving).
Cite
@article{arxiv.1601.05504,
title = {Entropy along expanding foliations},
author = {Jiagang Yang},
journal= {arXiv preprint arXiv:1601.05504},
year = {2018}
}
Comments
This is an improved version, here we add two new applications: Corollary E and Theorem F