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Existence of Selberg surfaces of arbitrarily large genus

Determine whether there exists a sequence of closed hyperbolic surfaces X_i with genera g_i tending to infinity such that the Laplacian spectral gap satisfies λ1(X_i) ≥ 1/4 for every surface in the sequence (i.e., whether Selberg surfaces exist in arbitrarily large genus).

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Background

The paper studies spectral gaps on random hyperbolic surfaces and discusses the asymptotically optimal gap 1/4 as genus grows. While sequences approaching 1/4 are known (resolving a conjecture of Buser), the existence of surfaces with spectral gap at least 1/4 in arbitrarily large genus—the analogue of Ramanujan graphs for surfaces—remains unresolved and is posed as a central open problem.

This problem is framed in the context of Selberg’s conjecture for modular surfaces and recent advances showing near-optimal spectral gaps in various random models, motivating a finer understanding of extremal spectral phenomena in large-genus families.

References

A significant and well known open problem, which has been around in some form presumably since the time of Buser's conjecture and seen a resurgence in interest since the resolution of this conjecture, is whether there exists {X_i} with g_i→∞ and λ_1(X_i)≥1/4. Do there exist Selberg surfaces of arbitrarily large genus?

Spectral gap with polynomial rate for Weil-Petersson random surfaces (2508.14874 - Hide et al., 20 Aug 2025) in Motivation, Section 1 (Introduction); Problem 1.1