Abstract:
We propose a method allowing us to build, for various typical means generated by the action of any given irrational rotation of the circle, examples of $L^2$ functions satisfying the central limit theorem (CLT). We consider for instance nonlinear means, and means along the sequence of squares. In the latter case, the circle method of Hardy–Littlewood is used. We also give an example of continuous Gaussian random Fourier series with sample paths satisfying both CLT and almost sure CLT.
Keywords:central limit theorem, almost sure central limit theorem, irrational rotations, nonlinear averages, square averages, weighted averages, Gaussian randomization, random Fourier series, circle method.
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