Second Order Ergodic Theorems for Ergodic Transformations of Infinite Measure Spaces
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Publication:3987967
DOI10.2307/2159790zbMath0738.28011OpenAlexW4247948508MaRDI QIDQ3987967
Manfred Denker, Jon. Aaronson, Albert Meads Fisher
Publication date: 28 June 1992
Full work available at URL: https://doi.org/10.2307/2159790
almost sure convergenceMarkov shiftpointwise dual ergodic transformationsmeasure-preserving dynamical systeminfinite measure spacesChung-Erdős averageslog-averagesreturn sequencesecond order ergodic theorems
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Cites Work
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- Transformations on [0,1 with infinite invariant measures]
- Random f-expansions
- The asymptotic distributional behaviour of transformations preserving infinite measures
- Integer Cantor sets and an order-two ergodic theorem
- Analogues of the Lebesgue Density Theorem for Fractal Sets of Reals and Integers
- Which Functions Preserve Cauchy Laws?
