Geometry and dynamics on sublinearly Morse boundaries of CAT(0) groups

Abstract

Given a sublinear function , -Morse boundaries X of proper spaces are introduced by Qing, Rafi and Tiozzo. It is a topological space that consists of a large set of quasi-geodesic rays and it is quasi-isometrically invariant and metrizable. In this paper, we study the sublinearly Morse boundaries with the assumption that there is a proper cocompact action of a group G on the space in question. We show that G acts minimally on G and that contracting elements of G induces a weak north-south dynamic on G. Furthermore, we show that a homeomorphism f G G' comes from a quasi-isometry if and only if f is successively quasi-m\"obius and stable. Lastly, we characterize exactly when the sublinearly Morse boundary of a space is compact.