Coarse embeddings of quotients by finite group actions
Abstract
We prove that for a metric space X and a finite group G acting on X by isometries, if X coarsely embeds into a Hilbert space, then so does the quotient X/G. A crucial step towards our main result is to show that for any integer k > 0 the space of unordered k-tuples of points in Hilbert space, with the 1-Wasserstein distance, itself coarsely embeds into Hilbert space. Our proof relies on establishing bounds on the sliced Wasserstein distance between empirical measures in Rn.
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