We establish quantitative Quantum Ergodicity type delocalisation theorem for eigenfunctions of the Laplacian on hyperbolic surfaces of large genus. In the compact setting our assumptions hold for random surfaces in the sense of Weil-Petersson volume in the Teichmüller space due to the work of Mirzakhani and in non-compact setting for Maass forms on arithmetic surfaces coming from congruence covers of the modular surface. The methods are based on analysis of Benjamini-Schramm scaling limits of metric measure spaces and the Kunze-Stein phenomenon in representation theory, and are inspired by similar results on graphs by Anantharaman et al. We plan to give a gentle introduction to the field before going to our results. Joint work with Etienne Le Masson (Cergy-Pontoise University, France).