This article is cited in
2 papers
MATHEMATICS
On the residual $\pi$-finiteness of some free products of groups with central amalgamated subgroups
A. V. Rozov Ivanovo State University, Ivanovo, Russian Federation
Abstract:
Let
$\pi$ be a set of primes. A criterion of residual
$\pi$-finiteness for free products of two groups with central amalgamated subgroups has been obtained for the case where one factor is a nilpotent finite rank group. Recall that a group
$G$ is said to be a residually finite
$\pi$-group if for every nonidentity element
$x$ of
$G$ there exists a homomorphism of the group
$G$ onto some finite
$\pi$-group such that the image of the element
$x$ differs from
$1$. A group
$G$ is said to be a finite rank group if there exists a positive integer r such that every finitely generated subgroup of group
$G$ is generated by at most
$r$ elements. Let
$G$ be a free product of groups
$A$ and
$B$ with normal amalgamated subgroups
$H$ and
$K$. Let also
$A$ and
$B$ be residually finite
$\pi$-groups and
$H$ be a central subgroup of the group
$A$. If
$H$ and
$K$ are finite, then
$G$ is a residually finite
$\pi$-group. The same holds if the groups
$A/H$ and
$B/K$ are finite
$\pi$-groups. However,
$G$ is not obligatorily a residually finite
$\pi$-group if we replace the requirement of finiteness of the groups
$A/H$ and
$B/K$ by a weaker requirement of
$A/H$ and
$B/K$ to be residually finite
$\pi$-groups. A corresponding example is provided in the article. Nevertheless, we prove that if
$A$ is a nilpotent finite rank group, then
$G$ is a residually finite
$\pi$-group if and only if
$A/H$ and
$B/K$ are residually finite
$\pi$-groups.
Keywords:
nilpotent finite rank group, group center, generalized free product of groups, residually finite $\pi$-group.
UDC:
512.543 Received: 12.02.2016
DOI:
10.17223/19988621/40/4
Fulltext:
PDF file (426 kB)