In this paper, we show that the Lipschitz-Killing Curvatures for the excursion sets of Arithmetic Random Waves (toral Gaussian eigenfunctions) are dominated, in the high-frequency regime, by a single chaotic component. The latter can be written as a simple explicit function of the threshold parameter times the centered norm of these random fields; as a consequence, these geometric functionals are fully correlated in the high-energy limit. The derived formulae show a clear analogy with related results on the round unit sphere and suggest the existence of a general formula for geometric functionals of random eigenfunctions on Riemannian manifolds
Random plane wave is conjectured to be a universal model for high-energy eigenfunctions of the Lapla...
Random hyperspherical harmonics are Gaussian Laplace eigenfunctions on the unit $d$-dimensional sphe...
We consider Berry's random planar wave model (1977), and prove spatial functional limit theorems - i...
In this paper, we show that the Lipschitz-Killing Curvatures for the excursion sets of Arithmetic Ra...
We obtain the limiting distribution of the nodal area of random Gaussian Laplace eigenfunctions on $...
Complex arithmetic random waves are stationary Gaussian complex-valued solutions of the Helmholtz eq...
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...
Complex arithmetic random waves are stationary Gaussian complex-valued solutions of the Helmholtz eq...
The topics presented in this thesis lie at the interface of probability theory and stochastic geomet...
"Arithmetic random waves" are the Gaussian Laplace eigenfunctions on the two-dimensional torus (Rudn...
The study of random Fourier series, linear combinations of trigonometric functions whose coefficient...
Forthcoming (2017) in Journal of Theoretical ProbabilityOur interest in this paper is to explore lim...
We consider the Riemannian random wave model of Gaussian linear combinations of Laplace eigenfunctio...
In this paper we investigate some geometric functionals for band-limited Gaussian and isotropic sphe...
Random plane wave is conjectured to be a universal model for high-energy eigenfunctions of the Lapla...
Random hyperspherical harmonics are Gaussian Laplace eigenfunctions on the unit $d$-dimensional sphe...
We consider Berry's random planar wave model (1977), and prove spatial functional limit theorems - i...
In this paper, we show that the Lipschitz-Killing Curvatures for the excursion sets of Arithmetic Ra...
We obtain the limiting distribution of the nodal area of random Gaussian Laplace eigenfunctions on $...
Complex arithmetic random waves are stationary Gaussian complex-valued solutions of the Helmholtz eq...
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...
Complex arithmetic random waves are stationary Gaussian complex-valued solutions of the Helmholtz eq...
The topics presented in this thesis lie at the interface of probability theory and stochastic geomet...
"Arithmetic random waves" are the Gaussian Laplace eigenfunctions on the two-dimensional torus (Rudn...
The study of random Fourier series, linear combinations of trigonometric functions whose coefficient...
Forthcoming (2017) in Journal of Theoretical ProbabilityOur interest in this paper is to explore lim...
We consider the Riemannian random wave model of Gaussian linear combinations of Laplace eigenfunctio...
In this paper we investigate some geometric functionals for band-limited Gaussian and isotropic sphe...
Random plane wave is conjectured to be a universal model for high-energy eigenfunctions of the Lapla...
Random hyperspherical harmonics are Gaussian Laplace eigenfunctions on the unit $d$-dimensional sphe...
We consider Berry's random planar wave model (1977), and prove spatial functional limit theorems - i...