On the Structure of the Mislin Genus of a Pullback

The notion of genus for finitely generated nilpotent groups was introduced by Mislin. Two finitely generated nilpotent groups Q and R belong to the same genus set G ( Q ) if and only if the two groups are nonisomorphic, but for each prime p , their p-localizations Q p and R p are isomorphic. Mislin and Hilton introduced the structure of a finite abelian group on the genus if the group Q has a finite commutator subgroup. In this study, we consider the class of finitely generated infinite nilpotent groups with a finite commutator subgroup. We construct a pullback H t from the l -equivalences H i → H and H j → H , t ≡ ( i + j ) m o d s , where s = | G ( H ) | , and compare its genus to that of H . Furthermore, we consider a pullback L of a direct product G × K of groups in this class. Here, we prove results on the group L and prove that its genus is nontrivial.