Edge sliding and ergodic hyperfinite decomposition
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 is treeable and has cost then it is induced by an a.e. free p.m.p. action of the free group on generators. More importantly, our techniques give a significant strengthening of this theorem: the action of can be arranged so that each of the 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.
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