Strongly Quasiconvex subgroups in graphs of groups
Abstract
Given a graph of groups G = (, \Gv\, \Ge\) with certain conditions on vertex groups and G acts acylindrically on its Bass-Serre tree T. Let H be a finitely generated subgroup of G. We prove the following statements equivalence: H has finite height, (G, T, H) is a A/QI--triple, H is strongly quasiconvex and virtually free in G. We also give a condition to determine whether strong quasiconvexity in a group is preserved under amalgams.
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