Counting problems from the viewpoint of ergodic theory: from primitive integer points to simple closed curves

Abstract: In her thesis, Mirzakhani showed that the number of simple closed geodesics of length ≤ L on a closed, connected, oriented hyperbolic surface X of genus g is asymptotic to L 6g−6 times a constant depending on the geometry of X. In this survey we give a detailed account of Mirzakhani's proof of this result aimed at non-experts. We draw inspiration from classic primitive lattice point counting results in homogeneous dynamics. The focus is on understanding how the general principles that drive the proof in the ca… Show more