Cross ratios on boundaries of symmetric spaces and Euclidean buildings
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We generalize the natural cross ratio on the ideal boundary of a rank one symmetric spaces, or even $\mathrm{CAT}(-1)$ space, to higher rank symmetric spaces and (non-locally compact) Euclidean buildings - we obtain vector valued cross ratios defined on simplices of the building at infinity. We show several properties of those cross ratios; for example that (under some restrictions) periods of hyperbolic isometries give back the translation vector. In addition, we show that cross ratio preserving maps on the chamber set are induced by isometries and vice versa - motivating that the cross ratios bring the geometry of the symmetric space/Euclidean building to the boundary.
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Cited by 1 Pith paper
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Asymptotically Moebius maps and rigidity for the hyperbolic plane
Sequences of asymptotically Möbius maps from ∂∞H² to ∂∞X converge after isometries to a map induced by an isometric embedding of H² into X when Isom(X) acts transitively on boundary triples.
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