The second moment of the Riemann zeta function at its local extrema

Abstract

Conrey and Ghosh studied the second moment of the Riemann zeta function, evaluated at its local extrema along the critical line, finding the leading order behaviour to be $\frac{e^2 - 5}{2 \pi} T (\log T)^2$. This problem is closely related to a mixed moment of the Riemann zeta function and its derivative. We present a new approach which will uncover the lower order terms for the second moment as a descending chain of powers of logarithms in the asymptotic expansion.

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Item Type:	Article
Authors/Creators:	Hughes, Christopher https://orcid.org/0000-0002-7649-3548 Pearce-Crump, Andrew Lugmayer, Solomon
Copyright, Publisher and Additional Information:	© 2025 The Author(s). This is an author-produced version of the published paper. Uploaded in accordance with the University’s Research Publications and Open Access policy.
Dates:	Accepted: 30 June 2025 Published: 29 July 2025
Institution:	The University of York
Academic Units:	The University of York > Faculty of Sciences (York) > Mathematics (York)
Depositing User:	Pure (York)
Date Deposited:	31 Jul 2025 08:00
Last Modified:	27 Aug 2025 14:56
Published Version:	https://doi.org/10.1112/jlms.70250
Status:	Published
Refereed:	Yes
Identification Number:	10.1112/jlms.70250
Open Archives Initiative ID (OAI ID):	oai:eprints.whiterose.ac.uk:229882

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The second moment of the Riemann zeta function at its local extrema

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