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RESEARCH ARTICLE
On fibers and accessibility of groups acting on trees with inversions
Rasheed Mahmood Saleh Mahmood Department of Mathematics, Irbid National University
Аннотация:
Throughout this paper the actions of groups on graphs with inversions are allowed. An element g of a group
$G$ is called inverter if there exists a tree
$X$ where
$G$ acts such that
$g$ transfers an edge of
$X$ into its inverse.
$A$ group
$G$ is called accessible if
$G$ is finitely generated and there exists a tree on which
$G$ acts such that each edge group is finite, no vertex is stabilized by
$G$, and each vertex group has at most one end. In this paper we show that if
$G$ is a group acting on a tree
$X$ such that if for each vertex
$v$ of
$X$, the vertex group
$G_{v}$ of
$v$ acts on a tree
$X_{v}$, the edge group
$G_{e}$ of each edge e of
$X$ is finite and contains no inverter elements of the vertex group
$G_{t(e)}$ of the terminal
$t(e)$ of
$e$, then we obtain a new tree denoted
$\widetilde{X}$ and is called a fiber tree such that
$G$ acts on
$\widetilde{X}$. As an application, we show that if
$G$ is a group acting on a tree
$X$ such that the edge group
$G_{e}$ for each edge
$e$ of
$X$ is finite and contains no inverter elements of
$G_{t(e)}$, the vertex
$G_{v}$ group of each vertex
$v$ of
$X$ is accessible, and the quotient graph
$G\diagup X$ for the action of
$G$ on
$X$ is finite, then
$G$ is an accessible group.
Ключевые слова:
ends of groups, groups acting on trees, accessible groups.
MSC: 20E06,
20E086,
20F05 Поступила в редакцию: 16.04.2013
Исправленный вариант: 07.11.2014
Язык публикации: английский