Vincent Guirardel
Published 2003-06-20, updated 2004-11-29Version 5
We give a simple proof of the finite presentation of Sela's limit groups by using free actions on R^n-trees. We first prove that Sela's limit groups do have a free action on an R^n-tree. We then prove that a finitely generated group having a free action on an R^n-tree can be obtained from free abelian groups and surface groups by a finite sequence of free products and amalgamations over cyclic groups. As a corollary, such a group is finitely presented, has a finite classifying space, its abelian subgroups are finitely generated and contains only finitely many conjugacy classes of non-cyclic maximal abelian subgroups.
Comments: Published by Geometry and Topology at http://www.maths.warwick.ac.uk/gt/GTVol8/paper39.abs.html
Journal: Geometry and Toplogy 8 (2004) 1427--1470
On the positive theory of groups acting on trees
Groups acting on rooted trees and their representations on the boundary
Amenability of groups acting on trees
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