Cannon-Thurston maps for hyperbolic free group extensions

Abstract

This paper gives a detailed analysis of the Cannon--Thurston maps associated to a general class of hyperbolic free group extensions. Let FN denote a free groups of finite rank N 3 and consider a convex cocompact subgroup Out(FN), i.e. one for which the orbit map from into the free factor complex of FN is a quasi-isometric embedding. The subgroup determines an extension E of FN, and the main theorem of Dowdall--Taylor DT1 states that in this situation E is hyperbolic if and only if is purely atoroidal. Here, we give an explicit geometric description of the Cannon--Thurston maps ∂ FN∂ E for these hyperbolic free group extensions, the existence of which follows from a general result of Mitra. In particular, we obtain a uniform bound on the multiplicity of the Cannon--Thurston map, showing that this map has multiplicity at most 2N. This theorem generalizes the main result of Kapovich and Lustig KapLusCT which treats the special case where is infinite cyclic. We also answer a question of Mahan Mitra by producing an explicit example of a hyperbolic free group extension for which the natural map from the boundary of to the space of laminations of the free group (with the Chabauty topology) is not continuous.