Infinite geodesics in hyperbolic random triangulations

Abstract

We study the structure of infinite geodesics in the Planar Stochastic Hyperbolic Triangulations Tλ, which are the hyperbolic analogs of the UIPT. We prove that these geodesics form a supercritical Galton--Watson tree with geometric offspring distribution. The tree of infinite geodesics in Tλ provides a new notion of boundary, which is a realization of the Poisson boundary. By scaling limits arguments, we also obtain a description of the tree of infinite geodesics in the hyperbolic Brownian plane. Finally, by combining our main result with a forthcoming paper, we obtain new hyperbolicity properties of Tλ: it satisfies a weaker form of Gromov-hyperbolicity and admits bi-infinite geodesics.