Projections from Furstenberg boundaries onto maximal flats and barycenter maps
Abstract
Let G be a semisimple connected Lie group of non-compact type with finite center. Let K<G be a maximal compact subgroup and P<G be a minimal parabolic subgroup. For any pair (F,x), where F is a maximal flat in G/K and x ∈ G/P is opposite to the Weyl chambers determined by F, we define a projection (F, x) ∈ F which is continuous and G-equivariant. Furthermore, if q ≥ 3, we exhibit a G-equivariant continuous map defined on an open subset of full measure of the space of q-tuples of (G/P)q with image in G/K. When G is the orientation preserving isometries of real hyperbolic space and q = 3, we recover the geometric barycenter of the corresponding ideal triangle. All our proofs are constructive.
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