Averages of determinants of Laplacians over moduli spaces for large genus
Abstract
Let Mg be the moduli space of hyperbolic surfaces of genus g endowed with the Weil-Petersson metric. We view the regularized determinant (ΔX) of Laplacian as a function on Mg and show that there exists a universal constant E>0 such that as g ∞, (1) the expected value of | (ΔX)4π(g-1)-E | over Mg has rate of decay g-δ for some uniform constant δ∈ (0,1); (2) the expected value of | (ΔX)4π(g-1)|β over Mg approaches to Eβ whenever β∈ [1,2).
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