Sufficient conditions for a group of homeomorphisms of the Cantor set to be two-generated

Abstract

Let C be some Cantor space. We study groups of homeomorphisms of C which are vigorous, or, which are flawless, where we introduce both of these terms here. We say a group G≤ Homeo(C) is vigorous if for any clopen set A and proper clopen subsets B and C of A there is γ ∈ G in the pointwise-stabiliser of C A with Bγ⊂eq C. Being vigorous is similar in impact to some of the conditions proposed by Epstein in his proof that certain groups of homeomorphisms of spaces have simple commutator subgroups (and/or related conditions, as proposed in some of the work of Matui or of Ling). A non-trivial group G≤ Homeo(C) is flawless if for all k and w a non-trivial freely reduced product expression on k variables (including inverse symbols), a particular subgroup w(G) of the verbal subgroup w(G) is the whole group. It is true, for instance, that flawless groups are both perfect and lawless. We show: 1) simple vigorous groups are either two-generated by torsion elements, or not finitely generated, 2) vigorous groups are simple if and only if they are flawless, and, 3) the class of vigorous simple subgroups of Homeo(C) is fairly broad (it contains many well known groups such as the commutator subgroups of the Higman-Thompson groups Gn,r, the Brin-Thompson groups nV, R\"over's group V(), and others of Nekrashevych's `simple groups of dynamical origin', and, the class is closed under various natural constructions).