Automorphism towers of groups of homeomorphisms of Cantor space

Abstract

We show that for any full and sufficiently transitive (i.e. flexible) group G of homeomorphisms of Cantor space, Aut(Aut(G)) = Aut(G). This class contains many generalisations of the Higman-Thompson groups Gn,r, and the Rational group R2 of Grigorchuk, Nekrashevych, and Suchanski . We also demonstrate that for generalisations Tn,r of R. Thompson's group T, Aut(Aut(Tn,r))= Aut(Tn,r). In the case of the groups Gn,r and Tn,r our results extend results of Brin and Guzm\' an for Thompson's group T, and generalisations of Thompson's group F.