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θ-transformations, θ-shifts and limit theorems for some Riesz-Raikov sums

Published online by Cambridge University Press:  19 September 2008

Bernard Petit
Affiliation:
Département de Mathématiques, U.F.R. des Sciences et Techniques, 6, avenue Victor Le Gorgeu, BP 809 29285 Brest Cedex, France

Abstract

By Fourier methods, it is possible to prove central limit theorems for Riesz-Raikov sums for any real θ > 1 and for a quite large class of functions f.

The same problem is solved here for Hölder-continuous functions f and Pisot–Vijayaragavan numbers θ in a totally different way: it is shown that the question is equivalent to working with ergodic sums for suitable functions F on [0;l], and T denoting the θ-transformation x ↦ θx mod 1. In addition, limit theorems are proved on the θ-shifts, for any real θ 1.

Type
Research Article
Copyright
Copyright © Cambridge University Press 1996

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