English

Extensions with shrinking fibers

Dynamical Systems 2020-04-09 v3

Abstract

We consider dynamical systems T:XXT: X \to X that are extensions of a factor S:YYS: Y \to Y through a projection π:XY\pi: X \to Y with shrinking fibers, i.e. such that TT is uniformly continuous along fibers π1(y)\pi^{-1}(y) and the diameter of iterate images of fibers Tn(π1(y))T^n(\pi^{-1}(y)) uniformly go to zero as nn \to \infty.We prove that every SS-invariant measure has a unique TT-invariant lift, and prove that many properties of the original measure lift: ergodicity, weak and strong mixing, decay of correlations and statistical properties (possibly with weakening in the rates).The basic tool is a variation of the Wasserstein distance, obtained by constraining the optimal transportation paradigm to displacements along the fibers. We extend to a general setting classical arguments, enabling to translate potentials and observables back and forth between XX and YY.

Keywords

Cite

@article{arxiv.1812.08437,
  title  = {Extensions with shrinking fibers},
  author = {Benoit Kloeckner},
  journal= {arXiv preprint arXiv:1812.08437},
  year   = {2020}
}

Comments

v3 - an error is corrected in Theorem A(ii): a continuity assumption is needed to lift physicality, as shown in Remark 4.8. Other small modifications

R2 v1 2026-06-23T06:50:54.382Z