Pierre Fima
Published 2012-02-29, updated 2012-09-20Version 2
We study under which condition an amalgamated free product or an HNN-extension over a finite subgroup admits an amenable, transitive and faithful action on an infinite countable set. We show that such an action exists if the initial groups admit an amenable and almost free action with infinite orbits (e.g. virtually free groups or infinite amenable groups). Our result relies on the Baire category Theorem. We extend the result to groups acting on trees.
Comments: v.2: minor changes, final version, to appear in Annales de l'Institut Fourier
High transitivity for more groups acting on trees
Permanent properties of amenable, transitive and faithful actions
Groups acting simply transitively on hyperbolic buildings
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