High points of a random model of the Riemann-zeta function and Gaussian multiplicative chaos

High points of a random model of the Riemann-zeta function and Gaussian multiplicative chaos

We study the total mass of high points in a random model for the Riemann-zeta function. We consider the same model as in Harper (2013) and Arguin et al. (2017), and build on the convergence to Gaussian multiplicative chaos proved in Saksman and Webb (2016). We show that the total mass of points whic...

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Bibliographic Details
Main Authors: Arguin, L.-P (Author), Hartung, L. (Author), Kistler, N. (Author)
Format: Article
Language:English
Published: Elsevier B.V. 2022
Subjects:
Extreme value
Extreme values
Functions
Gaussian beams
Gaussian distribution
Gaussian multiplicative chaos
Gaussian Processes
Gaussians
High point
High points
Linear order
Method of moments
Particle beam dynamics
Process time
Random Model
Riemann zeta functions
Riemann-Zeta function
Total mass
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