Percolation in the hyperbolic space: non-uniqueness phase and fibrous clusters

Abstract: In this thesis, I am going to consider Bernoulli percolation on graphs admitting vertex-transitive actions of groups of isometries of d-dimensional hyperbolic spaces H^d. In the first chapter, I give an overview concerning percolation and its terminology. In the separate introduction to each of the other chapters, I explain its contents more precisely, giving also some preliminaries needed therein. In the second chapter, I prove the existence of a non-trivial non-uniqueness phase of Bernoulli percolation on Cayley graphs for a wide class of Coxeter reflection groups of finite type polyhedra in H^3. In the third chapter, I consider some geometric property of the clusters in Bernoulli bond percolation in the non-uniqueness phase on a class of connected, transitive, locally finite graphs in H^d, for any d.