English

Edge sliding and ergodic hyperfinite decomposition

Dynamical Systems 2018-07-31 v2 Logic

Abstract

We use edge slidings and saturated disjoint Borel families to give a conceptually simple proof of Hjorth's theorem on cost attained: if a countable p.m.p. ergodic equivalence relation EE is treeable and has cost nN{}n \in \mathbb{N} \cup \{\infty\} then it is induced by an a.e. free p.m.p. action of the free group Fn\mathbb{F}_n on nn generators. More importantly, our techniques give a significant strengthening of this theorem: the action of Fn\mathbb{F}_n can be arranged so that each of the nn generators alone acts ergodically. The existence of an ergodic action for the first generator immediately follows from a powerful theorem of Tucker-Drob, whose proof however uses a recent substantial result in probability theory as a black box. We give a constructive and purely descriptive set theoretic proof of a weaker version of Tucker-Drob's theorem, which is enough for many of its applications, including our strengthening of Hjorth's theorem. Our proof uses new tools, such as asymptotic means on graphs, packed disjoint Borel families, and a cost threshold for finitizing the connected components of nonhyperfinite graphs.

Keywords

Cite

@article{arxiv.1704.06019,
  title  = {Edge sliding and ergodic hyperfinite decomposition},
  author = {Benjamin D. Miller and Anush Tserunyan},
  journal= {arXiv preprint arXiv:1704.06019},
  year   = {2018}
}

Comments

Corrected some typos and a minor error in the proof of Claim 6.20

R2 v1 2026-06-22T19:22:14.749Z