Abstract
Abstract
We prove that, for any countable acylindrically hyperbolic group G, there exists a generating set S of G such that the corresponding Cayley graph
$\Gamma (G,S)$
is hyperbolic,
$|\partial \Gamma (G,S)|>2$
, the natural action of G on
$\Gamma (G,S)$
is acylindrical and the natural action of G on the Gromov boundary
$\partial \Gamma (G,S)$
is hyperfinite. This result broadens the class of groups that admit a non-elementary acylindrical action on a hyperbolic space with a hyperfinite boundary action.
Publisher
Cambridge University Press (CUP)
Reference21 articles.
1. Countable Borel equivalence relations;Jackson;J. Math. Log,2002
2. [15] Kechris, A. S. , Classical Descriptive Set Theory , Graduate Texts in Mathematics, vol. 156 (Springer-Verlag, New York, 1995). MR 1321597
3. [18] Naryshkin, P. and Vaccaro, A. , ‘Hyperfiniteness and borel asymptotic dimension of boundary actions of hyperbolic groups’, Preprint, 2023, arXiv:2306.02056.
4. Unicorn paths and hyperfiniteness for the mapping class group;Przytycki;Forum Math. Sigma,2021
5. Measurable dynamics
Cited by
1 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献
1. Hyperfiniteness for group actions on trees;Proceedings of the American Mathematical Society;2024-07-19