Smooth random Gaussian functions play an important role in mathematical physics, a main example being the random plane wave model conjectured by Berry to give a universal description of high-energy eigenfunctions of the Laplacian on generic compact manifolds. Our work is motivated by questions about the geometry of such random functions, in particular relating to the structure of their nodal and level sets. We study four discretisation schemes that extract information about level sets of planar Gaussian fields. Each scheme recovers information up to a different level of precision, and each requires a maximum mesh-size in order to be valid with high probability. The first two schemes are generalisations and enhancements of similar schemes th...
This paper is second in the series, following Pranav et al. (2019), focused on the characterization ...
Studying the geometry generated by Gaussian and Gaussian-related random fields via their excursion s...
Abstract: Studying the geometry generated by Gaussian and Gaussian-related random fields via their e...
Smooth random Gaussian functions play an important role in mathematical physics, a main example bein...
Gaussian fields are widely used for modelling spatial phenomena in disciplines such as cosmology, me...
Nazarov and Sodin have shown that the number of connected components of the nodal set of a planar Ga...
For a smooth, stationary, planar Gaussian field, we consider the number of connected components of i...
In this thesis, we study the level sets of smooth Gaussian fields, or random smooth functions. Sever...
The Nazarov–Sodin constant describes the average number of nodal set components of smooth Gaussian f...
Abstract. The nodal densities of gaussian random functions, modelling various physical systems inclu...
Beginning with the predictions of Bogomolny–Schmit for the random plane wave, in recent years the de...
Beginning with the predictions of Bogomolny-Schmit for the random plane wave, in recent years the de...
A timely and comprehensive treatment of random field theory with applications across diverse areas o...
The topics presented in this thesis lie at the interface of probability theory and stochastic geomet...
We consider Berry's random planar wave model(1977) for a positiveLaplace eigenvalue E> 0 , both i...
This paper is second in the series, following Pranav et al. (2019), focused on the characterization ...
Studying the geometry generated by Gaussian and Gaussian-related random fields via their excursion s...
Abstract: Studying the geometry generated by Gaussian and Gaussian-related random fields via their e...
Smooth random Gaussian functions play an important role in mathematical physics, a main example bein...
Gaussian fields are widely used for modelling spatial phenomena in disciplines such as cosmology, me...
Nazarov and Sodin have shown that the number of connected components of the nodal set of a planar Ga...
For a smooth, stationary, planar Gaussian field, we consider the number of connected components of i...
In this thesis, we study the level sets of smooth Gaussian fields, or random smooth functions. Sever...
The Nazarov–Sodin constant describes the average number of nodal set components of smooth Gaussian f...
Abstract. The nodal densities of gaussian random functions, modelling various physical systems inclu...
Beginning with the predictions of Bogomolny–Schmit for the random plane wave, in recent years the de...
Beginning with the predictions of Bogomolny-Schmit for the random plane wave, in recent years the de...
A timely and comprehensive treatment of random field theory with applications across diverse areas o...
The topics presented in this thesis lie at the interface of probability theory and stochastic geomet...
We consider Berry's random planar wave model(1977) for a positiveLaplace eigenvalue E> 0 , both i...
This paper is second in the series, following Pranav et al. (2019), focused on the characterization ...
Studying the geometry generated by Gaussian and Gaussian-related random fields via their excursion s...
Abstract: Studying the geometry generated by Gaussian and Gaussian-related random fields via their e...