On equivalence relations induced by locally compact TSI Polish groups admitting open identity component
Abstract
For a Polish group G, let E(G) be the right coset equivalence relation Gω/c(G), where c(G) is the group of all convergent sequences in G. We prove a Rigid theorem on locally compact TSI Polish groups admitting open identity component, as follows: Let G be a locally compact TSI Polish group such that G0 is open in G, and let H be a nontrivial pro-Lie TSI Polish group. Then E(G)≤BE(H) iff there exists a continuous homomorphism φ:G0 H0 satisfying the following conditions: (i) (φ) is non-archimedean; (ii) φ InnG(G0)⊂eq InnH(H0)φ under pointwise convergence topology. An application of the Rigid theorem yields a negative answer to Question 7.5 of [2].
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