Abstract
We show that a totally dissipative system has all nonsingular systems as factors, but that this is no longer true when the factor maps are required to be finitary. In particular, if a nonsingular Bernoulli shift has a limiting marginal distribution p, then it cannot have, as a finitary factor, an independent and identically distributed (iid) system of entropy larger than H(p); on the other hand, we show that iid systems with entropy strictly lower than H(p) can be obtained as finitary factors of these Bernoulli shifts, extending Keane and Smorodinsky’s finitary version of Sinai’s factor theorem to the nonsingular setting. As a consequence of our results we also obtain that every transitive twice continuously differentiable Anosov diffeomorphism on a compact manifold, endowed with volume measure, has iid factors, and if the factor is required to be finitary, then the iid factor cannot have Kolmogorov–Sinai entropy greater than the measure-theoretic entropy of a Sinai–Ruelle–Bowen measure associated with the Anosov diffeomorphism.
Original language | English |
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Pages (from-to) | 597-634 |
Number of pages | 38 |
Journal | Journal of Modern Dynamics |
Volume | 20 |
DOIs | |
State | Published - 1 Oct 2024 |
Bibliographical note
Publisher Copyright:© 2024, American Institute of Mathematical Sciences. All rights reserved.
Keywords
- Anosov diffeomorphisms
- Bernoulli shifts
- dissipative systems
- entropy
- finitary factors
- nonsingular dynamics