The distribution of critical graphs of Jenkins-Strebel differentials

Abstract

By work of Jenkins and Strebel, given a Riemann surface X and a simple closed multi-curve α on it, there exists a unique quadratic differential q on X whose horizontal foliation is measure equivalent to α. We study the distribution of the critical graphs of these differentials in the moduli space of metric ribbon graphs as the extremal length of the multi-curves goes to infinity, showing they equidistribute to the Kontsevich measure regardless of the initial choice of X.