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Moments of C$β$E field partition function, $\mathsf{Sine}_β$ correlations and stochastic zeta

Published 9 Feb 2026 in math.PR and math-ph | (2602.08739v1)

Abstract: We prove a conjecture of Fyodorov and Keating on the supercritical moments of the partition function of the C$β$E field or equivalently the supercritical moments of moments of the characteristic polynomial of the C$β$E ensemble for general $β>0$ and general real moment exponents. Moreover, we give the first expression for all correlation functions of the $\mathsf{Sine}_β$ point process for all $β>0$. The main object behind both results is the Hua-Pickrell stochastic zeta function introduced by Li and Valkó.

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