Almost-automorphisms of trees, cloning systems and finiteness properties

Abstract

We prove that the group of almost-automorphisms of the infinite rooted regular d-ary tree Td arises naturally as the Thompson-like group of a so called d-ary cloning system. A similar phenomenon occurs for any R\"over-Nekrashevych group Vd(G), for G Aut(Td) a self-similar group. We use this framework to expand on work of Belk and Matucci, who proved that the R\"over group, using the Grigorchuk group for G, is of type F∞. Namely, we find some natural conditions on subgroups of G to ensure that Vd(G) is of type F∞, and in particular we prove this for all G in the infinite family of Suni\'c groups. We also prove that if G is itself of type F∞ then so is Vd(G), and that every finitely generated virtually free group is self-similar, so in particular every finitely generated virtually free group G yields a type F∞ R\"over-Nekrashevych group Vd(G).