On Dense Subgroups of Homeo(I)
Abstract
We prove that a dense subgroup of Homeo+(I) is not elementary amenable. We also show that the topological group Homeo+(I) does not satisfy the Stability of the Generators Property, moreover, any finitely generated subgroup of Homeo+(I) admits a faithful discrete representation in it. In the last section, we demonstrate that finitely generated dense subgroups have infinite girth.
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