Finite entropy actions of free groups, rigidity of stabilizers, and a Howe-Moore type phenomenon
From MaRDI portal
Publication:327608
DOI10.1007/s11854-016-0023-yzbMath1373.37019arXiv1205.5090OpenAlexW1608408159MaRDI QIDQ327608
Publication date: 19 October 2016
Published in: Journal d'Analyse Mathématique (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1205.5090
Generators, relations, and presentations of groups (20F05) Measure-preserving transformations (28D05) Ergodic theory on groups (22D40) Entropy and other invariants (28D20) Entropy and other invariants, isomorphism, classification in ergodic theory (37A35) Measurable group actions (22F10)
Related Items (8)
Fuglede-Kadison determinants and sofic entropy ⋮ Announce of an entropy formula for a class of actions coming from Gibbs measures ⋮ Correlation Bounds for Distant Parts of Factor of IID Processes ⋮ POLISH MODELS AND SOFIC ENTROPY ⋮ Entropy theory for sofic groupoids. I: The foundations ⋮ Krieger’s finite generator theorem for actions of countable groups III ⋮ Examples in the entropy theory of countable group actions ⋮ Weak containment of measure-preserving group actions
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Sofic measure entropy via finite partitions
- Weak isomorphisms between Bernoulli shifts
- Entropy and the variational principle for actions of sofic groups
- Bernoulli actions and infinite entropy
- Local variational principle concerning entropy of a sofic group action
- The measurable Kesten theorem
- Invariant random subgroups of the free group
- A measure-conjugacy invariant for free group actions
- The ergodic theory of free group actions: entropy and the \(f\)-invariant
- Asymptotic properties of unitary representations
- Stabilizers for ergodic actions of higher rank semisimple groups
- On problems related to growth, entropy, and spectrum in group theory
- Kesten's theorem for invariant random subgroups.
- Factors of Bernoulli shifts are Bernoulli shifts
- Soficity, amenability, and dynamical entropy
- Topological pressure and the variational principle for actions of sofic groups
- The Howe-Moore property for real and $p$-adic groups
- Sofic entropy and amenable groups
- Non-abelian free group actions: Markov processes, the Abramov–Rohlin formula and Yuzvinskii’s formula
- Mixing actions of countable groups are almost free
- Measure conjugacy invariants for actions of countable sofic groups
- A Juzvinskii addition theorem for finitely generated free group actions
- A subgroup formula for f-invariant entropy
- On Entropy and Generators of Measure-Preserving Transformations
This page was built for publication: Finite entropy actions of free groups, rigidity of stabilizers, and a Howe-Moore type phenomenon
