On self-similarity of p-adic analytic pro-p groups of small dimension

Abstract

Given a torsion-free p-adic analytic pro-p group G with dim(G) < p, we show that the self-similar actions of G on regular rooted trees can be studied through the virtual endomorphisms of the associated Zp-Lie lattice. We explicitly classify 3-dimensional unsolvable Zp-Lie lattices for p odd, and study their virtual endomorphisms. Together with Lazard's correspondence, this allows us to classify 3-dimensional unsolvable torsion-free p-adic analytic pro-p groups for p≥slant 5, and to determine which of them admit a faithful self-similar action on a p-ary tree. In particular, we show that no open subgroup of SL11(p) admits such an action. On the other hand, we prove that all the open subgroups of SL2(Zp) admit faithful self-similar actions on regular rooted trees.