Recursion formula for the volumes of moduli spaces of compact hyperbolic surfaces with cone points

Abstract

Let Vg,m,n( L, θ) be the Weil-Petersson volume of the moduli space of hyperbolic surfaces of genus g with m geodesic boundary components of length L=(1,...,m) and n cone points of angle θ=(θ1,...θn). By using the generalized McShane's identities, we show that Vg,m,n( L, θ) is a polynomial of (1,...,n,iθ1,...,iθm). And we obtain a recursion formula for Vg,m,n( L, θ), which is a generalization of Mirzakhani's result.

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