Vincent Guirardel, Gilbert Levitt
Published 2006-05-19, updated 2007-04-25Version 2
Let G be a finitely generated group. Two simplicial G-trees are said to be in the same deformation space if they have the same elliptic subgroups (if H fixes a point in one tree, it also does in the other). Examples include Culler-Vogtmann's outer space, and spaces of JSJ decompositions. We discuss what features are common to trees in a given deformation space, how to pass from one tree to all other trees in its deformation space, and the topology of deformation spaces. In particular, we prove that all deformation spaces are contractible complexes.
Comments: Update to published version. 43 pages
Journal: Groups, Geometry, and Dynamics. Volume 1, Issue 2, 2007, pp. 135-181
JSJ decompositions: definitions, existence, uniqueness. II. Compatibility and acylindricity
Deformation spaces of G-trees and automorphisms of Baumslag-Solitar groups
Deformation and rigidity of simplicial group actions on trees
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