Spectral gap of random hyperbolic surfaces
Abstract
Let X be a closed, connected, oriented surface of genus g, with a hyperbolic metric chosen at random according to the Weil--Petersson measure on the moduli space of Riemannian metrics. Let λ1=λ1(X) bethe first non-zero eigenvalue of the Laplacian on X or, in other words, the spectral gap.In this paper we give a full road-map to prove that for arbitrarily small~α>0,align* λ1 ≤ 14 - α2 g +∞ 0.align*The full proofs are deferred to separate papers.
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