On a question of Abért and Virág

Abstract

Abért and Virág proved in 2005 that the Hausdorff dimension of a non-trivial normal subgroup of a level-transitive 1-dimensional subgroup of the group of p-adic automorphisms Wp is always 1. They further asked whether the same holds replacing 1-dimensional with positive dimensional. On the one hand, we provide a negative answer in general by giving counterexamples where the non-trivial normal subgroups are not all 1-dimensional. Furthermore, these counterexamples are pro-p subgroups of Wp with positive Hausdorff dimension in Wp but with non-trivial center, and thus not weakly branch. On the other hand, we restrict ourselves to the class of self-similar groups and answer the question of Abért and Virág in the positive in this case. Along the way, we generalize a result of Abért and Virág on the closed subgroups of Wp being perfect in the sense of Hausdorff dimension to closed subgroups of any iterated wreath product WH and show that self-similar positive-dimensional subgroups of WH do not satisfy any group law.