Random hyperspherical harmonics are Gaussian Laplace eigenfunctions on the unit $d$-dimensional sphere ($d\ge 2$). We study the convergence in Total Variation distance for their nonlinear statistics in the high energy limit, i.e., for diverging sequences of Laplace eigenvalues. Our approach takes advantage of a recent result by Bally, Caramellino and Poly (2020): combining the Central Limit Theorem in Wasserstein distance obtained by Marinucci and Rossi (2015) for Hermite-rank $2$ functionals with new results on the asymptotic behavior of their Malliavin-Sobolev norms, we are able to establish second order Gaussian fluctuations in this stronger probability metric as soon as the functional is regular enough. Our argument requires some novel ...
peer reviewedWe develop techniques for determining the exact asymptotic speed of convergence in the ...
We determine the asymptotic law for the fluctuations of the total number of critical points of rand...
We prove Moderate Deviation estimates for nodal lengths of random spherical harmonics both on the w...
Random hyperspherical harmonics are Gaussian Laplace eigenfunctions on the unit d-dimensional sphere...
Random hyperspherical harmonics are Gaussian Laplace eigenfunctions on the unit d-sphere (d≥ 2). We ...
We prove Central Limit Theorems and Stein-like bounds for the asymptotic behaviour of nonlinear func...
We investigate Stein–Malliavin approximations for nonlinear functionals of geometric interest for ra...
We investigate Stein-Malliavin approximations for nonlinear functionals of geometric interest for ra...
In recent years, considerable interest has been drawn by the analysis of geometric functionals for t...
We establish here a quantitative central limit theorem (in Wasserstein distance) for the Euler–Poinc...
The topics presented in this thesis lie at the interface of probability theory and stochastic geomet...
=We consider a random Gaussian model of Laplace eigenfunctions on the hemisphere, satisfying the Dir...
In this paper, we show that the Lipschitz-Killing Curvatures for the excursion sets of Arithmetic Ra...
peer reviewedWe develop techniques for determining the exact asymptotic speed of convergence in the ...
We determine the asymptotic law for the fluctuations of the total number of critical points of rand...
We prove Moderate Deviation estimates for nodal lengths of random spherical harmonics both on the w...
Random hyperspherical harmonics are Gaussian Laplace eigenfunctions on the unit d-dimensional sphere...
Random hyperspherical harmonics are Gaussian Laplace eigenfunctions on the unit d-sphere (d≥ 2). We ...
We prove Central Limit Theorems and Stein-like bounds for the asymptotic behaviour of nonlinear func...
We investigate Stein–Malliavin approximations for nonlinear functionals of geometric interest for ra...
We investigate Stein-Malliavin approximations for nonlinear functionals of geometric interest for ra...
In recent years, considerable interest has been drawn by the analysis of geometric functionals for t...
We establish here a quantitative central limit theorem (in Wasserstein distance) for the Euler–Poinc...
The topics presented in this thesis lie at the interface of probability theory and stochastic geomet...
=We consider a random Gaussian model of Laplace eigenfunctions on the hemisphere, satisfying the Dir...
In this paper, we show that the Lipschitz-Killing Curvatures for the excursion sets of Arithmetic Ra...
peer reviewedWe develop techniques for determining the exact asymptotic speed of convergence in the ...
We determine the asymptotic law for the fluctuations of the total number of critical points of rand...
We prove Moderate Deviation estimates for nodal lengths of random spherical harmonics both on the w...