Towards optimal spectral gaps in large genus

Michael Lipnowski; Alex Wright

doi:10.1214/23-AOP1657

Abstract

We show that the Weil–Petersson probability that a random surface has first eigenvalue of the Laplacian less than $3 / 16 - ϵ$ goes to zero as the genus goes to infinity.

Funding Statement

During the preparation of this paper, the first author was partially supported by a NSERC Discovery Grant, and the second author was partially supported by a Clay Research Fellowship, NSF Grant DMS-1856155, and a Sloan Research Fellowship.

Acknowledgements

We thank Farrell Brumley, Andrew Granville, Rafe Mazzeo, Peter Sarnak, and Scott Wolpert for helpful conversations. We also especially thank Paul Apisa and the referees for detailed and helpful comments.

Citation

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Michael Lipnowski. Alex Wright. "Towards optimal spectral gaps in large genus." Ann. Probab. 52 (2) 545 - 575, March 2024. https://doi.org/10.1214/23-AOP1657

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Received: 1 May 2022; Revised: 1 July 2023; Published: March 2024

First available in Project Euclid: 4 March 2024

MathSciNet: MR4718401

Digital Object Identifier: 10.1214/23-AOP1657

Subjects:

Primary: 15A57 , 17B20 , 22E60 , 58C35

Abstract

Funding Statement

Acknowledgements

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