Asymptotically Moebius maps and rigidity for the hyperbolic plane

Abstract

Let S be a rank-one symmetric space of non-compact type and let X be a CAT(-1) space. A well-known result by Bourdon states that if a topological embedding : ∂∞ S → ∂∞ X respects cross ratios, that means crS( 0,η0,1,η1)=crX( (0),(η0),(1),(η1)) for every 0,η0,1,η1 ∈ ∂∞ S, then is induced by an isometric embedding of S into X. We generalize this result when S=H2 is the real hyperbolic plane as it follows. Let k: ∂∞ H2 → ∂∞ X be a sequence of continuous maps which are asymptotically Moebius, that means k ∞ crX(k(0),k(η0),k(1),k(η1))=crH2( 0,η0,1,η1) for every 0,η0,1,η1 ∈ ∂∞ H2. Assume that the isometry group Isom(X) acts transitively on triples of distinct points of ∂∞ X. Then there must exists a sequence (gk)k ∈ N, gk ∈ Isom(X) and a map ∞: ∂∞ H2→ ∂∞ X such that k ∞ gkk()=∞() for every ∈ ∂∞ H2 and ∞ is induced by an isometric embedding of H2 into X.