A combination theorem for affine tree-free groups

Abstract

Let 0 be an ordered abelian group. We show how an ATF(Z×0) group -- that is, a group admitting a free affine action without inversions on a Z×0-tree -- admits a natural graph of groups decomposition, where vertex groups inherit actions on 0-trees. Using recent work of various authors, it follows that a finitely generated group admitting a free affine action on a Zn-tree where no line has its orientation reversed is relatively hyperbolic with nilpotent parabolics, is locally quasiconvex, and has solvable word, conjugacy and isomorphism problems. Conversely, given a graph of groups satisfying certain conditions, we show how an affine action of its fundamental group can be constructed. Specialising to the case of free affine actions, we obtain a large class of ATF(Z×0) groups that do not act freely by isometries on any 1-tree. We also give an example of a group that admits a free isometric action on a Z×Z-tree but which is not residually nilpotent.