Smooth, mixing transformations with loosely Bernoulli Cartesian square
DOI10.1017/etds.2021.39zbMath1495.37002arXiv1912.11445OpenAlexW3166873153WikidataQ114118840 ScholiaQ114118840MaRDI QIDQ5027318
Publication date: 4 February 2022
Published in: Ergodic Theory and Dynamical Systems (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1912.11445
Dynamical aspects of measure-preserving transformations (37A05) Ergodicity, mixing, rates of mixing (37A25) Dynamical systems involving maps of the circle (37E10) Entropy and other invariants, isomorphism, classification in ergodic theory (37A35) Topological and differentiable equivalence, conjugacy, moduli, classification of dynamical systems (37C15) Rotation numbers and vectors (37E45)
Cites Work
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- Horocycle flows are loosely Bernoulli
- Systèmes localement de rang un
- The Cartesian square of the horocycle flow is not loosely Bernoulli
- A zero-entropy mixing transformation whose product with itself is loosely Bernoulli
- New \(K\)-automorphisms and a problem of Kakutani
- The Pascal adic transformation is loosely Bernoulli
- Rank one and mixing differentiable flows
- A smooth zero-entropy diffeomorphism whose product with itself is loosely Bernoulli
- Product of two staircase rank one transformations that is not loosely Bernoulli
- Smooth mixing flows with purely singular spectra
- In general a measure preserving transformation is mixing
- On Groups of Measure Preserving Transformations. I
- Loosely Bernoulli Cartesian Products
- Systems of finite rank
- Analytic mixing reparametrizations of irrational flows
- Continuous spectrum for a class of smooth mixing Schrödinger operators
- Equivalence of measure preserving transformations
- Product of two Kochergin flows with different exponents is not standard
- APPROXIMATIONS IN ERGODIC THEORY
- Induced measure preserving transformations
- Approximation Theories for Measure Preserving Transformations
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