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Autore principale: Wang, Eric
Natura: Preprint
Pubblicazione: 2026
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Accesso online:https://arxiv.org/abs/2605.29323
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author Wang, Eric
author_facet Wang, Eric
contents We establish a generalization of Anush Tserunyan and Jenna Zomback's 2024 Backward Ergodic Theorem. We remove the countable-to-one assumption and thus provide a backward ergodic theorem for arbitrary measure-preserving transformations. However, this new setting introduces measurability concerns as unlike the countable-to-one case, we no longer have a collection of Borel right inverses. Instead, we must rely on the Jankov, von Neumann uniformization theorem. Towards this, we use Borel and measured field structures introduced by Stefaan Vaes and Lise Wouters.
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publishDate 2026
record_format arxiv
spellingShingle A Backward Ergodic Theorem for Uncountable-to-one Transformations
Wang, Eric
Dynamical Systems
We establish a generalization of Anush Tserunyan and Jenna Zomback's 2024 Backward Ergodic Theorem. We remove the countable-to-one assumption and thus provide a backward ergodic theorem for arbitrary measure-preserving transformations. However, this new setting introduces measurability concerns as unlike the countable-to-one case, we no longer have a collection of Borel right inverses. Instead, we must rely on the Jankov, von Neumann uniformization theorem. Towards this, we use Borel and measured field structures introduced by Stefaan Vaes and Lise Wouters.
title A Backward Ergodic Theorem for Uncountable-to-one Transformations
topic Dynamical Systems
url https://arxiv.org/abs/2605.29323