Spectral gap with polynomial rate for random covering surfaces
Abstract
In this note we show that the recent work of Magee, Puder and van Handel [MPvH25] can be applied to obtain an optimal spectral gap result with polynomial error rate for uniformly random covers of closed hyperbolic surfaces. Let X be a closed hyperbolic surface. We show there exists b,c>0 such that a uniformly random degree-n cover Xn of X has no new Laplacian eigenvalues below 14-cn-b with probability tending to 1 as n∞.
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