SL(3,Z) is not Howson

Abstract

We give an explicit construction of two 2-generated subgroups H,K≤ (3,) whose intersection is not finitely generated. The construction takes place inside the standard parabolic subgroup 2 (2,)≤ (3,). The main point is to identify H K with the stabilizer of a point for an affine action of a free group on 2, and then to prove, using the Schreier graph of this action, that this stabilizer is not finitely generated. Furthermore, we prove that there exists a sequence of subgroups Hq, Kq ≤ (3,Z) such that (Hq)=(Kq)=4, and \[ (Hq Kq)≥ q+1, \] while Hq Kq is finitely generated.