Gespeichert in:
Bibliographische Detailangaben
1. Verfasser: Guilloux, Victor Le
Format: Preprint
Veröffentlicht: 2026
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2605.23626
Tags: Tag hinzufügen
Keine Tags, Fügen Sie den ersten Tag hinzu!
_version_ 1866917524588724224
author Guilloux, Victor Le
author_facet Guilloux, Victor Le
contents In this article we provide an integration formula making us able to integrate random variables defined on the moduli space of hyperbolic surfaces which involve the lengths of closed geodesics belonging to a fixed arbitrary mapping class group orbit. This generalizes Mirzakhani's formula for simple geodesics and the integration formula of our previous paper on geodesics with exactly one self-intersection. We then compute the general expression of the length function of an arbitrary closed loop in Fenchel-Nielsen coordinates. Using this expression together with our integration formula, we prove that the integral of a geometric random variable can be expressed as an integral over R for a measure with density with respect to the Lebesgue measure. By studying the asymptotic behavior of this density function (at fixed genus and number of boundaries on the base surface), given an arbitrary closed loop $γ$, we obtain an improvement of Mirzakhani's asymptotic equivalent of the Weil-Petersson expectation E[N$γ$(a)], when a $\rightarrow$ $\infty$, of the number of geodesics in the same mapping class group orbit as $γ$ of length at most a. This also generalizes the conclusions of our previous article on eight-shaped geodesics.
format Preprint
id arxiv_https___arxiv_org_abs_2605_23626
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Integrals of general geometric random variables on the moduli space of hyperbolic surfaces
Guilloux, Victor Le
Geometric Topology
In this article we provide an integration formula making us able to integrate random variables defined on the moduli space of hyperbolic surfaces which involve the lengths of closed geodesics belonging to a fixed arbitrary mapping class group orbit. This generalizes Mirzakhani's formula for simple geodesics and the integration formula of our previous paper on geodesics with exactly one self-intersection. We then compute the general expression of the length function of an arbitrary closed loop in Fenchel-Nielsen coordinates. Using this expression together with our integration formula, we prove that the integral of a geometric random variable can be expressed as an integral over R for a measure with density with respect to the Lebesgue measure. By studying the asymptotic behavior of this density function (at fixed genus and number of boundaries on the base surface), given an arbitrary closed loop $γ$, we obtain an improvement of Mirzakhani's asymptotic equivalent of the Weil-Petersson expectation E[N$γ$(a)], when a $\rightarrow$ $\infty$, of the number of geodesics in the same mapping class group orbit as $γ$ of length at most a. This also generalizes the conclusions of our previous article on eight-shaped geodesics.
title Integrals of general geometric random variables on the moduli space of hyperbolic surfaces
topic Geometric Topology
url https://arxiv.org/abs/2605.23626