Non-closed subgroups of weakly branch groups
Abstract
For a weakly branch group G acting on a regular enough rooted tree, we provide two constructions of continuous families of distinct subgroups that are not closed in the profinite topology on G. On the one hand, we construct a continuous family of distinct non-closed subgroups such that each H in the family is not ERF, that is, contains subgroups not closed in the profinite topology on H. On the other hand, under an additional assumption on G, we construct a continuous family of ERF subgroups which are not closed in the congruence (and in the profinite) topology on G.
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