Andrews-Curtis and Nielsen equivalence relations on some infinite groups

Abstract

The Andrews-Curtis conjecture asserts that, for a free group Fn of rank n and a free basis (x1,...,xn), any normally generating tuple (y1,...,yn) is Andrews-Curtis equivalent to (x1,...,xn). This equivalence corresponds to the actions of AutFn and of Fn on normally generating n-tuples. The equivalence corresponding to the action of AutFn on generating n-tuples is called Nielsen equivalence. The conjecture for arbitrary finitely generated group has its own importance to analyse potential counter-examples to the original conjecture. We study the Andrews-Curtis and Nielsen equivalence in the class of finitely generated groups for which every maximal subgroup is normal, including nilpotent groups and Grigorchuk groups.