Stretched-exponential mixing for C1+α skew products with discontinuities
Abstract
Consider the skew product F:T2 T2, F(x,y)= (f(x),y+τ(x)), where f:T1 T1 is a piecewise C1+α expanding map on a countable partition and τ:T1 R is piecewise C1. It is shown that if τ is not Lipschitz-cohomologous to a piecewise constant function on the joint partition of τ and f, then F is mixing at a stretched-exponential rate.
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