On lengths of HZ-localization towers

Abstract

In this paper, the H Z-length of different groups is studied. By definition, this is the length of H Z-localization tower or the length of transfinite lower central series of H Z-localization. It is proved that, for a free noncyclic group, its H Z-length is ≥ ω+2. For a large class of Z[C]-modules M, where C is an infinite cyclic group, it is proved that the H Z-length of the semi-direct product M C is ≤ ω+1 and its H Z-localization can be described as a central extension of its pro-nilpotent completion. In particular, this class covers modules M, such that M C is finitely presented and H2(M C) is finite.