On equivalence relations induced by locally compact abelian Polish groups

Abstract

Given 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. The connected component of the identity of a Polish group G is denoted by G0. Let G,H be locally compact abelian Polish groups. If E(G)≤B E(H), then there is a continuous homomorphism S:G0→ H0 such that (S) is non-archimedean. The converse is also true when G is connected and compact. For n∈ N+, the partially ordered set P(ω)/Fin can be embedded into Borel equivalence relations between E( Rn) and E( Tn).