The universal Cannon--Thurston maps and the boundary of the curve complex
arXiv:0808.3521 · doi:10.4171/CMH/240
Abstract
In genus two and higher, the fundamental group of a closed surface acts naturally on the curve complex of the surface with one puncture. Combining ideas from previous work of Kent--Leininger--Schleimer and Mitra, we construct a universal Cannon--Thurston map from a subset of the circle at infinity for the closed surface group onto the boundary of the curve complex of the once-punctured surface. Using the techniques we have developed, we also show that the boundary of this curve complex is locally path-connected.
v2. Minor reorganization and revisions throughout. Several typos fixed