Measure-preserving rank one transformations
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Publication:4985021
DOI10.1090/mosc/310zbMath1465.37004arXiv2005.00449OpenAlexW3136899231MaRDI QIDQ4985021
Publication date: 21 April 2021
Published in: Transactions of the Moscow Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2005.00449
Measure-preserving transformations (28D05) Dynamical systems involving one-parameter continuous families of measure-preserving transformations (37A10)
Related Items (3)
Compact families and typical entropy invariants of measure-preserving actions ⋮ Mixing sets for rigid transformations ⋮ Dynamical properties of minimal Ferenczi subshifts
Cites Work
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- On the correlation of the Moebius function with rank-one systems
- On spectral disjointness of powers for rank-one transformations and Möbius orthogonality
- The conjugacy problem in ergodic theory
- Thouvenot's isomorphism problem for tensor powers of ergodic flows
- Disjointness, divisibility, and quasi-simplicity of measure-preserving actions
- On the centralizer of an infinite mixing rank-one transformation
- Conjecture: In general a mixing transformation is not two-fold mixing
- Joining-rank and the structure of finite rank mixing transformations
- Chacon's automorphism has minimal self joinings
- An example of a measure preserving map with minimal self-joinings, and applications
- Mixing of all orders and pairwise independent joinings of systems with singular spectrum
- A simple map with no prime factors
- On the spectral type of Ornstein's class one transformations
- Rank one transformations with singular spectral type
- Rokhlin's multiple mixing problem in the class of positive local rank actions
- The homogeneous spectrum problem in ergodic theory
- Simple systems and their higher order self-joinings
- Ergodic properties where order 4 implies infinite order
- The generic transformation can be embedded in a flow.
- Generic mixing transformations are rank 1
- Stochastic intertwinings and multiple mixing of dynamical systems
- A prime system with many self-joinings
- Weak closure of infinite actions of rank 1, joinings, and spectrum
- Weak closures of ergodic actions
- Bounded gaps between primes
- On the spectral and mixing properties of rank-one constructions in ergodic theory
- An automorphism with simple, continuous spectrum not having the group property
- Two nonisomorphic dynamical systems with the same simple continuous spectrum
- Around King’s rank-one theorems: Flows and ℤⁿ-actions
- Bounded ergodic constructions, disjointness, and weak limits of powers
- Poisson suspensions and SuShis
- Twofold mixing implies threefold mixing for rank one transformations
- Spectral rigidity of group actions: Applications to the case gr⟨𝑡,𝑠;𝑡𝑠=𝑠𝑡²⟩
- Weak limits of powers, simple spectrum of symmetric products, and rank-one mixing constructions
- Mixing on rank-one transformations
- Factors, rank, and embedding of a generic $ \mathbb Z^n$-action in an $ \mathbb R^n$-flow
- Complete metric on the set of mixing transformations
- The commutant is the weak closure of the powers, for rank-1 transformations
- SPECTRAL PROPERTIES OF GENERIC DYNAMICAL SYSTEMS
- Transformations With Discrete Spectrum are Stacking Transformations
- Intertwinings of tensor products, and the stochastic centralizer of dynamical systems
- Smorodinsky’s conjecture on rank-one mixing
- Disjointness of the convolutionsfor Chacon's automorphism
- The generic transformation has roots of all orders
- Special weak limits and simple spectrum of the tensor products of flows
- A survey on spectral multiplicities of ergodic actions
- Weakly homoclinic groups of ergodic actions
- Weak limits of powers of Chacon’s automorphism
- Ergodic homoclinic groups, Sidon constructions and Poisson suspensions
- On invariant measures
- APPROXIMATIONS IN ERGODIC THEORY
- Weakly Mixing Transformations Which are Not Strongly Mixing
- A Class of Ergodic Transformations Having Simple Spectrum
- Non-unique inclusion in a flow and vast centralizer of a generic measure-preserving transformation
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