$\mathrm{L}^1$ full groups of flows
Abstract
We introduce the concept of an full group associated with a measure-preserving action of a Polish normed group on a standard probability space. These groups carry a natural Polish group topology induced by an norm. Our construction generalizes full groups of actions of discrete groups, which have been studied recently by the first author. We show that under minor assumptions on the actions, topological derived subgroups of full groups are topologically simple and -- when the acting group is locally compact and amenable -- are whirly amenable and generically two-generated. full groups of actions of compactly generated locally compact Polish groups are shown to remember the orbit equivalence class of the action. For measure-preserving actions of the real line (also often called measure-preserving flows), the topological derived subgroup of an full groups is shown to coincide with the kernel of the index map, which implies that full groups of free measure-preserving flows are topologically finitely generated if and only if the flow admits finitely many ergodic components. We also prove a reconstruction-type result: the full group completely characterizes the associated ergodic flow up to flip Kakutani equivalence. Finally, we study the coarse geometry of the full groups. The norm on the derived subgroup of the full group of an aperiodic action of a locally compact amenable group is proved to be maximal in the sense of C. Rosendal. For measure-preserving flows, this holds for the norm on all of the full group.
Cite
@article{arxiv.2108.09009,
title = {$\mathrm{L}^1$ full groups of flows},
author = {François Le Maître and Konstantin Slutsky},
journal= {arXiv preprint arXiv:2108.09009},
year = {2025}
}
Comments
Accepted for publication in Memoirs of the EMS. Additional appendices on $\mathrm L^0$ and $\mathrm{L}^1$ spaces; chapter 2 revamped so that it is more independent from previous litterature; added an index. Many fixes thanks to referee comments. 145 pages