On abstract commensurators of surface groups

Abstract

Let be the fundamental group of a surface of finite type and Comm() be its abstract commensurator. Then Comm() contains the solvable Baumslag--Solitar groups a ,b : a b a-1 = bn for any n > 1. Moreover, the Baumslag--Solitar group a ,b : a b2 a-1 = b3 has an image in Comm() that is not residually finite. Our proofs are computer-assisted. Our results also illustrate that finitely-generated subgroups of Comm() are concrete objects amenable to computational methods. For example, we give a proof that a ,b : a b2 a-1 = b3 is not residually finite without the use of normal forms of HNN extensions.