Length partition of random multicurves on large genus hyperbolic surfaces

Abstract

We study the length statistics of the components of a random multicurve on a surface of genus g ≥ 2. For each fixed genus, the existence of such statistics follows from the work of M.~Mirzakhani, F.~Arana-Herrera and M.~Liu. We prove that as the genus g tends to infinity the statistics converge in law to the Poisson--Dirichlet distribution of parameter θ=1/2. In particular, as the genus tends to infinity the mean length of the three longest components converge respectively to 75.8\%, 17.1\% and 4.9\% of the total length.