Higher rank hyperbolicity
Abstract
The large-scale geometry of hyperbolic metric spaces exhibits many distinctive features, such as the stability of quasi-geodesics (the Morse Lemma), the visibility property, and the homeomorphism between visual boundaries induced by a quasi-isometry. We prove a number of closely analogous results for spaces of rank in an asymptotic sense, under some weak assumptions reminiscent of nonpositive curvature. For this purpose we replace quasi-geodesic lines with quasi-minimizing (locally finite) -cycles of volume growth; prime examples include -cycles associated with -quasiflats. Solving an asymptotic Plateau problem and producing unique tangent cones at infinity for such cycles, we show in particular that every quasi-isometry between two proper CAT(0) spaces of asymptotic rank extends to a class of -cycles in the Tits boundaries.
Cite
@article{arxiv.1810.12994,
title = {Higher rank hyperbolicity},
author = {Bruce Kleiner and Urs Lang},
journal= {arXiv preprint arXiv:1810.12994},
year = {2019}
}
Comments
59 pages. Visual metrics added, minor improvements