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Flexibility of statistical properties for smooth systems satisfying the central limit theorem

In this paper we exhibit new classes of smooth systems which satisfy the Central Limit Theorem (CLT) and have (at least) one of the following properties: (1) zero entropy; (2) weak but not strong mixing; (3) (polynomially) mixing but not $K$; (4) $K$ but not Bernoulli; (5) non Bernoulli and mixing at arbitrary fast polynomial rate. We also give an example of a system satisfying the CLT where the normalizing sequence is regularly varying with index $1$.

preprint2020arXivOpen access
Dmitry DolgopyatChangguang DongAdam KanigowskiPeter Nándori
math.DS
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Dmitry DolgopyatChangguang DongAdam KanigowskiPeter Nándori

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