Non-abelian free groups admit non-essentially free actions on rooted trees
Abstract
We show that every countable non-abelian free group admits a spherically transitive action on a rooted tree T such that the action of on the boundary of T is not essentially free. This reproves a result of Bergeron and Gaboriau. The existence of such an action answers a question of Grigorchuk, Nekrashevich and Sushchanskii.
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