A lot of attention has been drawn over the last few years by the investigation of the geometry of spherical random eigenfunctions (random spherical harmonics) in the high‐frequency regime, that is, for diverging eigenvalues. In this paper, we present a review of these results and we collect for the first time a comprehensive numerical investigation, focussing on particular on the behavior of Lipschitz‐Killing curvatures/Minkowski functionals (i.e., the area, the boundary length, and the Euler‐Poincaré characteristic of excursion sets) and on critical points. We show in particular that very accurate analytic predictions exist for their expected values and variances, for the correlation among these functionals, and for the cancellation that o...
=We consider a random Gaussian model of Laplace eigenfunctions on the hemisphere, satisfying the Dir...
We study the correlation between the total number of critical points of random spherical harmonics a...
We prove Moderate Deviation estimates for nodal lengths of random spherical harmonics both on the w...
The high frequency behaviour for random eigenfunctions of the spherical Laplacian has been recently ...
We study here the random fluctuations in the number of critical points with values in an interval I ...
In recent years, considerable interest has been drawn by the analysis of geometric functionals for t...
We study the correlation between the total number of critical points of random spherical harmonics a...
We establish here a quantitative central limit theorem (in Wasserstein distance) for the Euler–Poinc...
We determine the asymptotic law for the fluctuations of the total number of critical points of rand...
In this short note, we build upon recent results from [7] to present a precise expression for the a...
In this paper, we show that the Lipschitz-Killing Curvatures for the excursion sets of Arithmetic Ra...
The defect of a function f : M -> R is defined as the difference between the measure of the posit...
We study the limiting distribution of critical points and extrema of random spherical harmonics, in ...
We study the limiting distribution of critical points and extrema of random spherical harmonics, in ...
=We consider a random Gaussian model of Laplace eigenfunctions on the hemisphere, satisfying the Dir...
We study the correlation between the total number of critical points of random spherical harmonics a...
We prove Moderate Deviation estimates for nodal lengths of random spherical harmonics both on the w...
The high frequency behaviour for random eigenfunctions of the spherical Laplacian has been recently ...
We study here the random fluctuations in the number of critical points with values in an interval I ...
In recent years, considerable interest has been drawn by the analysis of geometric functionals for t...
We study the correlation between the total number of critical points of random spherical harmonics a...
We establish here a quantitative central limit theorem (in Wasserstein distance) for the Euler–Poinc...
We determine the asymptotic law for the fluctuations of the total number of critical points of rand...
In this short note, we build upon recent results from [7] to present a precise expression for the a...
In this paper, we show that the Lipschitz-Killing Curvatures for the excursion sets of Arithmetic Ra...
The defect of a function f : M -> R is defined as the difference between the measure of the posit...
We study the limiting distribution of critical points and extrema of random spherical harmonics, in ...
We study the limiting distribution of critical points and extrema of random spherical harmonics, in ...
=We consider a random Gaussian model of Laplace eigenfunctions on the hemisphere, satisfying the Dir...
We study the correlation between the total number of critical points of random spherical harmonics a...
We prove Moderate Deviation estimates for nodal lengths of random spherical harmonics both on the w...