Using tools from the theory of optimal transport, we establish several results concerning isometric actions of amenable topological groups with potentially unbounded orbits. Specifically, suppose d is a compatible left-invariant metric on an amenable topological group G with no non-trivial homomorphisms to R. Then, for every finite subset E G and ε>0, there is a finitely supported probability measure β on G such that ₆, ₇ ₄\, W (βg, βh) <ε, where W denotes the Wasserstein distance between probability measures on the metric space (G, d). When d is the word metric on a finitely generated group G, this strengthens a well known theorem of Reiter and, when d is bounded, recovers a result of Schneider and Thom. Furthermore, when G is locally compact, β may be replaced by an appropriate probability density f L¹ (G). Also, when G X is a continuous isometric action on a metric space, the space of Lipschitz functions on the quotient X/\!\!/G is isometrically isomorphic to a 1-complemented subspace of the Lipschitz functions on X. And, when additionally G is skew-amenable, there is a G-invariant contraction Lip\, X S (X/\!\!/G) so that (Sϕ) (Gx) =ϕ (x) whenever ϕ is constant on every orbit of G X. This latter extends results of Cuth and Doucha from the setting of locally compact or balanced groups.
Christian Rosendal (Fri,) studied this question.
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