Invariant means for the wobbling group
Abstract
Given a metric space (X,d), the wobbling group of X is the group of bijections g:X→ X satisfying x∈ X d(g(x),x)<∞. We study algebraic and analytic properties of W(X) in relation with the metric space structure of X, such as amenability of the action of the lamplighter group X Z/2 Z W(X) on X Z/2 Z and property (T).
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