Skip to main content

We use cookies to distinguish you from other users and to provide you with a better experience on our websites. Close this message to accept cookies or find out how to manage your cookie settings.

Close cookie message
Cancel
×
×
Home
  • Home
Article
  • Cited by 1
  • Cited by
    Crossref Citations
    Crossref logo
    This article has been cited by the following publications. This list is generated based on data provided by CrossRef.
    Mineyev, Igor Monod, Nicolas and Shalom, Yehuda 2004. Ideal bicombings for hyperbolic groups and applications. Topology, Vol. 43, Issue. 6, p. 1319.
    ×
  • Get access
    Add to cart USD35.00
    Check if you have access via personal or institutional login
    Log in Register Recommend to librarian

Some new rigidity results for stable orbit equivalence

  • Scot Adams (a1)
Abstract

Broadly speaking, we prove that an action of a group with very little commutativity cannot be stably orbit equivalent to an action of a group with enough commutativity, assuming both actions are free and finite measure preserving. For example, one group may be SL2(ℝ) and the other a group with infinite discrete center (e.g., the universal cover of SL2(ℝ)); I believe this is the first rigidity result of this type for a pair of simpleLie groups both of split rank one. Another example: one group may be any nonelementary word hyperbolic group, the other any group with infinite discrete center.

Copyright
COPYRIGHT: © Cambridge University Press 1995
References
Hide All
[Ad1]Adams, S.. Indecomposability of treed equivalence relations. Israel J. Math. 64:3 (1988), 362380.
[Ad2]Adams, S.. Indecomposability of equivalence relations generated by word hyperbolic groups. To appear.
[Ad3]Adams, S.. Boundary amenability for word hyperbolic groups and an application to smooth dynamics of simple groups. Topology. To appear.
[Ad4]Adams, S.. Generalities on amenable actions. Preprint.
[Arv1]Arveson, W.. Invitation to C*-algebras. Springer: New York, 1976.
[Ch1]Champetier, C.. Propriétŕs statistiques des groupes de présentation finie. Preprint. 1992.
[FHM1]Feldman, J., Hahn, P. and Moore, C.. Orbit structure and countable sections for actions of continuous groups. Adv. Math. 28 (1978), 186230.
[FSZ1]Feldman, J., Sutherland, C. and Zimmer, R.. Subrelations of ergodic equivalence relations. Ergod. Th. & Dynam. Sys. 9 (1989), 239269.
[Fur1]Furstenberg, H.. Recurrence in Ergodic Theory and Combinatorial Number Theory. Princeton University Press: Princeton, 1981.
[GH1]Ghys, E., de la Harpe, P., Troyanov, M., Salem, E., Ballman, W., Haefliger, A. and Strebel, R.. Sur les Groupes Hyperboliques d' après Mikhael Gromov. Ghys, E. and de la Harpe, P., eds. Birkhäuser: Boston, 1990.
[Kec1]Kechris, A.. Countable sections for locally compact group actions. Ergod. Th. & Dynam. Sys. 12 (1992), 283295.
[Munk1]Munkres, J.. Topology, a First Course. Prentice-Hall: Englewood Cliffs, 1975.
[Zim1]Zimmer, R.. Strong rigidity for ergodic actions of semisimple Lie groups. Ann. Math. 112 (1980), 511529.
[Zim2]Zimmer, R.. Ergodic Theory and Semisimple Groups. Birkhäuser: Boston, 1984.
[Zim3]Zimmer, R.. Ergodic actions of semisimple groups and product relations. Ann. Math. 118 (1983), 919.
[Zim4]Zimmer, R.. Ergodic theory, semisimple Lie groups and foliations by manifolds of negative curvature. Publ. Math. IHES 55 (1982), 3762.
Recommend this journal

Email your librarian or administrator to recommend adding this journal to your organisation's collection.

Ergodic Theory and Dynamical Systems
  • ISSN: 0143-3857
  • EISSN: 1469-4417
  • URL: /core/journals/ergodic-theory-and-dynamical-systems
Please enter your name
Please enter a valid email address
Who would you like to send this to? *

CAPTCHA *

Skip to the audio challenge
×

Metrics

Full text views

Total number of HTML views: 0
Total number of PDF views: 4 *
Loading metrics...

Abstract views

Total abstract views: 56 *
Loading metrics...

* Views captured on Cambridge Core between September 2016 - 12th June 2018. This data will be updated every 24 hours.

Cancel
Confirm
×