Elementary coordinatization of finitely generated nilpotent groups

Abstract

This paper has two main parts. In the first part we develop an elementary coordinatization for any nilpotent group G taking exponents in a binomial principal ideal domain (PID) A. In case that the additive group A+ of A is finitely generated we prove using a classical result of Julia Robinson that one can obtain a central series for G where the action of the ring of integers on the quotients of each of the consecutive terms of the series except for one very specific gap, called the special gap, is interpretable in G. Then we use a refinement of this central series to give a criterion for elementary equivalence of finitely generated nilpotent groups in terms of the relationship between group extensions and the second cohomology group.