Exponential volumes of moduli spaces of hyperbolic surfaces
Alexander B. Goncharov, Zhe Sun
TL;DR
This paper introduces a new finite volume measure on moduli spaces of hyperbolic surfaces with cusps, generalizing classical volumes and potentially impacting open string theory.
Contribution
It defines an exponential volume form on these moduli spaces, proving its finiteness and deriving a recursion formula generalizing Mirzakhani's results.
Findings
Exponential volume form is always finite.
Derived a recursion formula for integrals over moduli spaces.
Proposed a new analog of Weil-Petersson volumes for hyperbolic surfaces.
Abstract
A decorated surface S is an oriented topological surface with marked points on the boundary considered modulo the isotopy. We consider the moduli space of hyperbolic structures on S with geodesic boundary, such that the hyperbolic structure near each marked point is a cusp, equipped with a horocycle. This space carries a volume form. Let us fix the set K of distances between the horocycles at the adjacent cusps, and the set L of lengths of boundary circles without cusps. We get a subspace M(S; K,L) with the induced volume form Vol(K,L). However, if the cusps are present, the volume of the space M(S; K,L) is infinite. We introduce the exponential volume form exp(-W)Vol(K,L), where W is a positive function on the moduli space, given by the sum over cusps of the hyperbolic areas enclosed between the cusp and the horocycle at the cusp. We prove that the exponential volume, defined as the…
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Taxonomy
TopicsMathematical Dynamics and Fractals · Geometric Analysis and Curvature Flows · Algebraic Geometry and Number Theory