A random cover of a compact hyperbolic surface has relative spectral gap 316-

Abstract

Let X be a compact connected hyperbolic surface, that is, a closed connected orientable smooth surface with a Riemannian metric of constant curvature -1. For each n∈N, let Xn be a random degree-n cover of X sampled uniformly from all degree-n Riemannian covering spaces of X. An eigenvalue of X or Xn is an eigenvalue of the associated Laplacian operator X or Xn. We say that an eigenvalue of Xn is new if it occurs with greater multiplicity than in X. We prove that for any >0, with probability tending to 1 as n∞, there are no new eigenvalues of Xn below 316-. We conjecture that the same result holds with 316 replaced by 14.