Generation and Simplicity in the Airplane Rearrangement Group

Abstract

We study the group TA of rearrangements of the Airplane limit space introduced by Belk and Forrest in [3]. We prove that TA is generated by a copy of Thompson's group F and a copy of Thompson's group T, hence it is finitely generated. Then we study the commutator subgroup [TA, TA], proving that the abelianization of TA is isomorphic to Z and that [TA, TA] is simple, finitely generated and acts 2-transitively on the so-called components of the Airplane limit space. Moreover, we show that TA is contained in T and contains a natural copy of the Basilica rearrangement group TB studied in [2].