Morse theory on moduli of curves

Abstract

We provide a new approach to studying the moduli space of curves via Morse theory and hyperbolic geometry, by introducing a family of Morse functions on the moduli space Mg,n of stable curves of genus g with n marked point, from the Teichm\"uller theoretic perspective. They are weighted exponential averages of the lengths of all simple closed geodesics. These Morse functions behave well with respect to the Deligne-Mumford stratification of Mg,n. The critical points can be characterized by a combinatorial property named eutacticity, and the Morse index can be computed accordingly. Also, the Weil-Petersson gradient flow of the Morse functions is well defined on Mg,n, which can be used to build the Morse theory. These functions might be the first explicit examples of Morse functions on Mg,n, and the Morse handle decomposition gives rise to the first example of a natural cell decomposition of Mg,n in theory, that works for all pairs (g,n).