arXiv:1907.05810 Abstract | arXiv Analytics

arXiv:1907.05810 [math.PR]Abstract References Reviews Resources

On the Correlation of Critical Points and Angular Trispectrum for Random Spherical Harmonics

Published 2019-07-12Version 1

We prove a Central Limit Theorem for the Critical Points of Random Spherical Harmonics, in the High-Energy Limit. The result is a consequence of a deeper characterizations of the total number of critical points, which are shown to be asymptotically fully correlated with the sample trispectrum, i.e., the integral of the fourth Hermite polynomial evaluated on the eigenfunctions themselves. As a consequence, the total number of critical points and the nodal length are fully correlated for random spherical harmonics, in the high-energy limit.

Categories: math.PR, math-ph, math.MP

Subjects: 60G60, 62M15, 53C65, 42C10, 33C55

Keywords: random spherical harmonics, critical points, angular trispectrum, correlation, total number

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