The Asymptotic Statistics of Random Covering Surfaces

Abstract

Let g be the fundamental group of a closed connected orientable surface of genus g≥2. We develop a new method for integrating over the representation space Xg,n=Hom(g,Sn) where Sn is the symmetric group of permutations of \1,…,n\. Equivalently, this is the space of all vertex-labeled, n-sheeted covering spaces of the the closed surface of genus g. Given φ∈Xg,n and γ∈g, we let fixγ(φ) be the number of fixed points of the permutation φ(γ). The function fixγ is a special case of a natural family of functions on Xg,n called Wilson loops. Our new methodology leads to an asymptotic formula, as n∞, for the expectation of fixγ with respect to the uniform probability measure on Xg,n, which is denoted by Eg,n[fixγ]. We prove that if γ∈g is not the identity, and q is maximal such that γ is a qth power in g, then \[ Eg,n[fixγ]=d(q)+O(n-1) \] as n∞, where d(q) is the number of divisors of q. Even the weaker corollary that Eg,n[fixγ]=o(n) as n∞ is a new result of this paper. We also prove that if γ is not the identity then Eg,n[fixγ] can be approximated to any order O(n-M) by a polynomial in n-1.