Hyperbolic branching Brownian motion: the empirical limit measure

Abstract

We study branching Brownian motion in hyperbolic space. As hyperbolic Brownian motion is transient, the normalised empirical measure of branching Brownian motion converges to a random measure μ∞ on the boundary. We show that the Hausdorff dimension of μ∞ is (2β) 1 where β is the branching rate, and that μ∞ admits a Lebesgue density for β>1/2. This is very different to the behaviour of the set of accumulation points on the boundary where βc=1/8 which has been shown by Lalley and Sellke lalleyhyperbolic1997. This answers several questions posed by Woess woessnotes2024 and similar questions posed by Candellero and Hutchcroft candelleroboundary2023. We believe that our methods also apply to branching random walks on non-elementary hyperbolic groups.