On canonical splittings of relatively hyperbolic groups

A JSJ decomposition of a group is a splitting that allows one to classify all possible splittings of the group over a certain family of edge groups. Although JSJ decompositions are not unique in general, Guirardel--Levitt have constructed a canonical JSJ decomposition, the tree of cylinders, which classifies splittings of relatively hyperbolic groups over elementary subgroups. In this paper, we give a new topological construction of the Guirardel--Levitt tree of cylinders, and we show that this tree depends only on the homeomorphism type of the Bowditch boundary. Furthermore, the tree of cylinders admits a natural action by the group of homeomorphisms of the boundary. In particular, the quasi-isometry group of $(G,\mathbb{P})$ acts naturally on the tree of cylinders.
Comment: 31 pages, Section 5 from the previous version has been rewritten and is now Section 5 and Section 6. Statements and proofs of various results have been simplified throughout the paper