An embedding version of Rubin's theorem
Abstract
Rubin's theorem asserts that if X and Y are Rubin actions, then any group isomorphism induces an equivariant homeomorphism Y X. We provide an embedding version of Rubin's theorem highlighting group embeddings that induce a spatial equivariant map of a certain form. We further showcase instances of such embeddings between generalized Brin-Thompson groups.
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