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A note on the eigenvalue rigidity of hyperbolic surfaces in the random cover model
Published 1 Mar 2026 in math.SP, math.GT, and math.PR | (2603.01127v1)
Abstract: Let $X$ be a compact connected orientable hyperbolic surface and $X_n$ be a degree $n$ random cover. We show that, with high probability, the distribution of eigenvalues of the Laplacian on $X_n$ converges to the spectral measure of the hyperbolic plane with polynomially decaying error. This is analogous to the eigenvalue rigidity property for graphs of Huang--Yau [arXiv:2102.00963] and improves the logarithmic bound of Monk [arXiv:2002.00869]. Our proof relies on the Selberg trace formula and a variant of the polynomial method.
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