Asymptotic independence for random permutations from surface groups
Abstract
Let X be an orientable hyperbolic surface of genus g≥ 2 with a marked point o, and let be an orientable hyperbolic surface group isomorphic to π1(X,o). Consider the space Hom(,Sn) which corresponds to n-sheeted covers of X with labeled fiber. Given γ∈ and a uniformly random φ∈Hom(,Sn), what is the expected number of fixed points of φ(γ)? Formally, let Fn(γ) denote the number of fixed points of φ(γ) for a uniformly random φ∈Hom(,Sn). We think of Fn(γ) as a random variable on the space Hom(,Sn). We show that an arbitrary fixed number of products of the variables Fn(γ) are asymptotically independent as n∞ when there are no obvious obstructions. We also determine the limiting distribution of such products. Additionally, we examine short cycle statistics in random permutations of the form φ(γ) for a uniformly random φ∈Hom(,Sn). We show a similar asymptotic independence result and determine the limiting distribution.
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