Oliver Butterley, Peyman Eslami
Published 2014-05-27Version 1
We consider the skew product $F: (x,u) \mapsto (f(x), u + \tau(x))$, where the base map $f : \mathbb{T}^{1} \to \mathbb{T}^{1}$ is piecewise $\mathcal{C}^{2}$, covering and uniformly expanding, and the fibre map $\tau : \mathbb{T}^{1} \to \mathbb{R}$ is piecewise $\mathcal{C}^{2}$. We show the dichotomy that either this system mixes exponentially or $\tau$ is cohomologous (via a Lipschitz function) to a piecewise constant.
Stretched-exponential mixing for $\mathscr{C}^{1+α}$ skew products with discontinuities
Invariant Gragh and Random Bony Attractors
Uniqueness and exponential mixing for the measure of maximal entropy for piecewise hyperbolic maps
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