Mathematics – Group Theory
Scientific paper
2007-08-21
Lobachevskii Journal of Mathematics. 11 (2002). 27-38
Mathematics
Group Theory
10 pages; for other papers of this author, see http://icu.ivanovo.ac.ru/tg-seminar
Scientific paper
Let $G$ be a free product of two groups with amalgamated subgroup, $\pi$ be either the set of all prime numbers or the one-element set \{$p$\} for some prime number $p$. Denote by $\Sigma$ the family of all cyclic subgroups of group $G$, which are separable in the class of all finite $\pi$-groups. Obviously, cyclic subgroups of the free factors, which aren't separable in these factors by the family of all normal subgroups of finite $\pi$-index of group $G$, the subgroups conjugated with them and all subgroups, which aren't $\pi^{\prime}$-isolated, don't belong to $\Sigma$. Some sufficient conditions are obtained for $\Sigma$ to coincide with the family of all other $\pi^{\prime}$-isolated cyclic subgroups of group $G$. It is proved, in particular, that the residual $p$-finiteness of a free product with cyclic amalgamation implies the $p$-separability of all $p^{\prime}$-isolated cyclic subgroups if the free factors are free or finitely generated residually $p$-finite nilpotent groups.
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