English

An uncountable Mackey-Zimmer theorem

Dynamical Systems 2022-05-03 v4 Functional Analysis

Abstract

The Mackey-Zimmer theorem classifies ergodic group extensions XX of a measure-preserving system YY by a compact group KK, by showing that such extensions are isomorphic to a group skew-product XYρHX \equiv Y \rtimes_\rho H for some closed subgroup HH of KK. An analogous theorem is also available for ergodic homogeneous extensions XX of YY, namely that they are isomorphic to a homogeneous skew-product YρH/MY \rtimes_\rho H/M. These theorems have many uses in ergodic theory, for instance playing a key role in the Host-Kra structural theory of characteristic factors of measure-preserving systems. The existing proofs of the Mackey-Zimmer theorem require various "countability", "separability", or "metrizability" hypotheses on the group Γ\Gamma that acts on the system, the base space YY, and the group KK used to perform the extension. In this paper we generalize the Mackey-Zimmer theorem to "uncountable" settings in which these hypotheses are omitted, at the cost of making the notion of a measure-preserving system and a group extension more abstract. However, this abstraction is partially counteracted by the use of a "canonical model" for abstract measure-preserving systems developed in a companion paper. In subsequent work we will apply this theorem to also obtain uncountable versions of the Host-Kra structural theory.

Keywords

Cite

@article{arxiv.2010.00574,
  title  = {An uncountable Mackey-Zimmer theorem},
  author = {Asgar Jamneshan and Terence Tao},
  journal= {arXiv preprint arXiv:2010.00574},
  year   = {2022}
}

Comments

56 pages, 8 figures; [v4]: final version accepted for publication in Studia Math. Also modified the notation in line with referee comments on this paper and related papers

R2 v1 2026-06-23T18:56:40.799Z