LIMIT LAWS FOR DISTORTED CRITICAL RETURN TIME PROCESSES IN INFINITE ERGODIC THEORY
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Publication:3439934
DOI10.1142/S0219493707001962zbMath1114.37007arXivmath/0607681OpenAlexW2127478331MaRDI QIDQ3439934
Mehdi Slassi, Marc Kesseböhmer
Publication date: 21 May 2007
Published in: Stochastics and Dynamics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0509609
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Related Items (7)
Limit theory for the sample autocovariance for heavy-tailed stationary infinitely divisible processes generated by conservative flows ⋮ Limit theorems for conservative flows on multiple stochastic integrals ⋮ An effective estimate for the Lebesgue measure of preimages of iterates of the Farey map ⋮ A functional non-central limit theorem for multiple-stable processes with long-range dependence ⋮ LARGE DEVIATION ASYMPTOTICS FOR CONTINUED FRACTION EXPANSIONS ⋮ A distributional limit law for the continued fraction digit sum ⋮ Limit theorems for long-memory flows on Wiener chaos
Cites Work
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- Transformations on [0,1 with infinite invariant measures]
- Distributional limit theorems in infinite ergodic theory
- Random f-expansions
- Estimates of the invariant densities of endomorphisms with indifferent fixed points
- A limit theorem for the Perron-Frobenius operator of transformations on [0,1 with indifferent fixed points]
- The Dynkin-Lamperti arc-sine laws for measure preserving transformations
- Regularly varying functions
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