On the Cantor-Bendixson rank of the Grigorchuk group and the Gupta-Sidki 3 group
Abstract
We study the Cantor--Bendixson rank of the space of subgroups for members of a general class of finitely generated self-replicating branch groups. In particular, we show for G either the Grigorchuk group or the Gupta--Sidki 3 group, the Cantor--Bendixson rank of Sub(G) is ω. For each natural number n, we additionally characterize the subgroups of rank n and give a description of subgroups in the perfect kernel.
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