On the Andrews-Curtis groups: non-finite presentability

Abstract

The Andrews-Curtis conjecture remains one of the outstanding open problems in combinatorial group theory. It claims that every normally generating r-tuple of a free group Fr of rank r≥ 2 can be reduced to a basis by means of Nielsen transformations and arbitrary conjugations. These transformations generate the so-called Andrews-Curtis group AC(Fr). The groups AC(Fr) (r = 2, 3, …) are actively investigated and allows various generalizations, for which there are a number of results. At the same time, almost nothing is known about the structure and properties of the original groups AC(Fr). In this paper we define a class \Ar, s: r, s ≥ 1\ of generalized Andrews-Curtis groups in which any group Ar,r is isomorphic to the Andrews-Curtis group AC(Fr). We prove that every group A2,s\, (s ≥ 1) is non-finitely presented. Hence the Andrews-Curtis group AC(F2) A2,2 is non-finitely presented. Thus, we give a partial answer to the well-known question about the finite presentability of the groups AC(Fr), explicitly stated by J. Swan and A. Lisitsa in the Kourovka notebook KN (Question 18.89).