Exponentially mixing, locally constant skew extensions of shift maps
Abstract
It is known that locally constant toral extensions of hyperbolic systems can never mix at an exponential rate. In this note we exhibit some examples of non-abelian locally constant compact extensions of the shift map which are exponentially mixing for Holder-L2 observables. The proof rests on a result of Bourgain-Gamburd and a decoupling argument.
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