Normal generation and 2-betti numbers of groups

Abstract

The normal rank of a group is the minimal number of elements whose normal closure coincides with the group. We study the relation between the normal rank of a group and its first 2-Betti number and conjecture that inequality β1(2)(G) does not exceed normal rank minus 1 for torsion free groups. The conjecture is proved for limits of left-orderable amenable groups. On the other hand, for every n 2 and every >0, we give an example of a simple group Q (with torsion) such that β1(2)(Q) ≥ n-1-ε. These groups also provide examples of simple groups of rank exactly n for every n 2; existence of such examples for n> 3 was unknown until now.