Moebius rigidity of invariant metrics in boundaries of symmetric spaces of rank 1
Abstract
Let ∂ Hn K denote the boundary of a symmetric space of rank-one and of non-compact type and let dH be the Kor\'anyi metric defined in ∂ Hn K. We prove that if d is a metric on ∂ Hn K such that all Heisenberg similarities are d-M\"obius maps, then under a topological condition d is a constant multiple of a power of dH.
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