Spectral gap of random covers of negatively curved noncompact surfaces
Abstract
Let (X,g) be a complete noncompact geometrically finite surface with pinched negative curvature -b2≤ Kg ≤ -1. Let λ0(X) denote the bottom of the L2-spectrum of the Laplacian on the universal cover X. We show that a uniformly random degree-n cover Xn of X has no eigenvalues below λ0(X)- other than those of X and with the same multiplicity, with probability tending to 1 as n ∞. This extends a result of Hide--Magee to metrics of pinched negative curvature.
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