We prove convergence of Hausdorff measure of level sets of smooth Gaussian fields when the levels converge. Given two coupled stationary fields f1, f2, we estimate the difference of Hausdorff measure of level sets in expectation, in terms of C2-fluctuations of the field F = f1 − f2. The main idea in the proof is to represent difference in volume as an integral of mean curvature using the divergence theorem. This approach is different from using Kac-Rice type formula as main tool in the analysis
Dans cette thèse, on étudie les ensembles de niveau de champs gaussiens lisses, ou fonctions lisses ...
For a smooth stationary Gaussian field on $\mathbb{R}^d$ and level $\ell \in \mathbb{R}$, we conside...
AbstractFor a two-dimensional, homogeneous, Gaussian random field X(t) and compact, convex S ⊂ R2 we...
We prove convergence of Hausdorff measure of level sets of smooth Gaussian fields when the levels co...
Nazarov and Sodin have shown that the number of connected components of the nodal set of a planar Ga...
For a smooth stationary Gaussian field f on R d and level ℓ ∈ R, we consider the number of connected...
For a smooth, stationary, planar Gaussian field, we consider the number of connected components of i...
Gaussian fields are widely used for modelling spatial phenomena in disciplines such as cosmology, me...
We derive a covariance formula for the class of ‘topological events’ of smooth Gaussian fields on ma...
Let X(t) be a Gaussian random field R d → R. Using the notion of (d − 1)-integral geometric measures...
In this thesis, we study the level sets of smooth Gaussian fields, or random smooth functions. Sever...
General conditions on smooth real valued random fields are given that ensure the finiteness of the m...
AbstractA formula is proved for the expectation of the (d−1)-dimensional measure of the intersection...
In this paper we study the properties of the centered (norm of the) gradient squared of the discrete...
We show that, for general convolution approximations to a large class of log-correlated fields, inc...
Dans cette thèse, on étudie les ensembles de niveau de champs gaussiens lisses, ou fonctions lisses ...
For a smooth stationary Gaussian field on $\mathbb{R}^d$ and level $\ell \in \mathbb{R}$, we conside...
AbstractFor a two-dimensional, homogeneous, Gaussian random field X(t) and compact, convex S ⊂ R2 we...
We prove convergence of Hausdorff measure of level sets of smooth Gaussian fields when the levels co...
Nazarov and Sodin have shown that the number of connected components of the nodal set of a planar Ga...
For a smooth stationary Gaussian field f on R d and level ℓ ∈ R, we consider the number of connected...
For a smooth, stationary, planar Gaussian field, we consider the number of connected components of i...
Gaussian fields are widely used for modelling spatial phenomena in disciplines such as cosmology, me...
We derive a covariance formula for the class of ‘topological events’ of smooth Gaussian fields on ma...
Let X(t) be a Gaussian random field R d → R. Using the notion of (d − 1)-integral geometric measures...
In this thesis, we study the level sets of smooth Gaussian fields, or random smooth functions. Sever...
General conditions on smooth real valued random fields are given that ensure the finiteness of the m...
AbstractA formula is proved for the expectation of the (d−1)-dimensional measure of the intersection...
In this paper we study the properties of the centered (norm of the) gradient squared of the discrete...
We show that, for general convolution approximations to a large class of log-correlated fields, inc...
Dans cette thèse, on étudie les ensembles de niveau de champs gaussiens lisses, ou fonctions lisses ...
For a smooth stationary Gaussian field on $\mathbb{R}^d$ and level $\ell \in \mathbb{R}$, we conside...
AbstractFor a two-dimensional, homogeneous, Gaussian random field X(t) and compact, convex S ⊂ R2 we...