Spectral gap for Weil-Petersson random surfaces with cusps
Abstract
We show that for any ε>0, α∈[0,12), as g∞ a generic finite-area genus g hyperbolic surface with n=O(gα) cusps, sampled with probability arising from the Weil-Petersson metric on moduli space, has no non-zero eigenvalue of the Laplacian below 14-(2α+14)2-ε. For α=0 this gives a spectral gap of size 316-ε and for any α<12 gives a uniform spectral gap of explicit size.
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