The space of actions, partition metric and combinatorial rigidity

Abert, Miklos and Elek, Gabor (2026) The space of actions, partition metric and combinatorial rigidity. Groups, Geometry, and Dynamics, 20 (1). pp. 1-20. ISSN 1661-7207

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Abstract

We introduce a natural pseudometric on the space of actions of d-generated groups. In this pseudometric, the zero classes correspond to the weak equivalence classes defined by Kechris, and the metric identification is compact. We achieve this by employing symbolic dynamics and an ultraproduct construction which also facilitates the extension of our results to unitary representations. As a byproduct, we show that the weak equivalence class of every free non-amenable action contains an action that satisfies the measurable von Neumann problem.

Item Type:

Journal Article

Journal or Publication Title:

Groups, Geometry, and Dynamics

Uncontrolled Keywords:

Research Output Funding/yes_externally_funded

Subjects:

?? yes - externally fundeddiscrete mathematics and combinatoricsgeometry and topology ??

Departments:

Faculty of Science and Technology > Mathematics and Statistics

ID Code:

232470

Deposited By:

ep_importer_pure

Deposited On:

30 Sep 2025 09:25

Refereed?:

Yes

Published?:

Published

Last Modified:

17 Mar 2026 00:11

URI:

https://eprints.lancs.ac.uk/id/eprint/232470