Invariant spanning double rays in amenable groups
Abstract
A well-known result of Benjamini, Lyons, Peres, and Schramm states that if G is a finitely generated Cayley graph of a group , then is amenable if and only if G admits a -invariant random spanning tree with at most two ends. We show that this is equivalent to the existence of a -invariant random spanning double ray in a power of G.
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