Automorphisms of the generalised Thompson's group Tn,r

Abstract

The recent paper "The further chameleon groups of Richard Thompson and Graham Higman: automorphisms via dynamics for the Higman groups Gn,r" of Bleak, Cameron, Maissel, Navas and Olukoya (BCMNO) characterises the automorphisms of the Higman-Thompson groups Gn,r as the specific subgroup of the rational group Rn,r of Grigorchuk, Nekrashevych and Suchanski i's consisting of those elements which have the additional property of being bi-synchronizing. In this article, we extend the arguments of BCMNO and characterise the automorphism group of Tn,r as a subgroup of AutGn,r. We then show that the groups OutTn,r can be identified with subgroups of the group OutTn,n-1. Extending results of Brin and Guzman, we show that the groups OutTn,r, for n>2, are all infinite and contain an isomorphic copy of Thompson's group F. For X ∈ \T,G\, we study the groups OutXn,r and show that these fit in a lattice structure where OutXn,1 OutXn,r for all 1 r n-1 and OutXn,r OutXn,n-1. This gives a partial answer to a question in BCMNO concerning the normal subgroup structure of OutGn,n-1. Furthermore, we deduce that for 1 j,d n-1 such that d = (j, n-1), OutXn,j = OutXn,d extending a result of BCMNO for the groups Gn,r to the groups Tn,r. We give a negative answer to the question in BCMNO which asks whether or not OutGn,r OutGn,s if and only if (n-1,r) = (n-1,s). We conclude by showing that the groups Tn,r have the R∞ property extending the result of Burillo, Matucci and Ventura and, independently, Gon calves and Sankaran, for Thompson's group T.