Generic distributional limits for measure preserving transformations (Q793861)
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scientific article; zbMATH DE number 3857425
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Generic distributional limits for measure preserving transformations |
scientific article; zbMATH DE number 3857425 |
Statements
Generic distributional limits for measure preserving transformations (English)
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1984
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We construct a conservative ergodic measure preserving transformation of the real line \(({\mathbb{R}},{\mathbb{B}},m,T)\) whose Birkhoff sums are distributionally generic in the following sense: For every random variable Y on \([0,\infty]\) there are constants \(a_ n>0\) and a subsequence \(n_ k\to \infty\) so that \[ P-dist.(1/a_{n_ k})\sum^{n_ k}_{j=1}f{\mathbb{O}}T^ j\to dist.Y\int_{{\mathbb{R}}}fdm \] for every m-absolutely continuous probability P, and non-negative integrable function f.
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conservative ergodic measure preserving transformation
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Birkhoff sums
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distributionally generic
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0.90620047
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0.89859074
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0.8911552
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0.8869472
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0.87888837
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0.87829024
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0.8779415
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