Nielsen equivalence in small cancellation groups

Abstract

Let G be a group given by the presentation [<a1,...,ak,b1,... bk\,| ai=ui( b), bi=vi( a) for 1 i k>,] where k 2 and where the ui∈ F(b1,..., bk) and wi∈ F(a1,..., ak) are random words. Generically such a group is a small cancellation group and it is clear that (a1,...,ak) and (b1,...,bk) are generating n-tuples for G. We prove that for generic choices of u1,..., uk and v1,..., vk the "once-stabilized" tuples (a1,..., ak,1) and (b1,...,bk,1) are not Nielsen equivalent in G. This provides a counter-example for a Wiegold-type conjecture in the setting of word-hyperbolic groups. We conjecture that in the above construction at least k stabilizations are needed to make the tuples (a1,..., ak) and (b1,...,bk) Nielsen equivalent.