${\bi T},{\bi T}^{\bf -1}$ is not standard
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Publication:4236779
DOI10.1017/S0143385798108283zbMath0919.28011OpenAlexW2004393657MaRDI QIDQ4236779
Deborah Heicklen, Christopher Hoffmann
Publication date: 5 May 1999
Published in: Ergodic Theory and Dynamical Systems (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1017/s0143385798108283
Related Items (11)
Informal research statement ⋮ Entropy and \(\sigma\)-algebra equivalence of certain random walks on random sceneries ⋮ When T is an irrational rotation, and are Bernoulli: explicit isomorphisms ⋮ Sufficient conditions for the filtration of a stationary processes to be standard ⋮ Sufficient conditions of standardness for filtrations of stationary processes taking values in a finite space ⋮ Entropy and dyadic equivalence of random walks on a random scenery ⋮ A dyadic endomorphism which is Bernoulli but not standard ⋮ Bernoulliness of when is an irrational rotation: towards an explicit isomorphism ⋮ Filtrations associated to some two-to-one transformations ⋮ Vershik’s Intermediate Level Standardness Criterion and the Scale of an Automorphism ⋮ Filtrations of the Erased-Word Processes
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