Let $\mathcal{X}= \{X(t) : t \in \mathbb{R}^N \} $ be an isotropic Gaussian random field with real values.In a first part we study the mean number of critical points of $\mathcal{X}$ with index $k$ using random matrices tools.We obtain an exact expression for the probability density of the $k$th eigenvalue of a $N$-GOE matrix.We deduce some exact expressions for the mean number of critical points with a given index. In a second part we study attraction or repulsion between these critical points. A measure is the correlation function.We prove attraction between critical points when $N>2$, neutrality for $N=2$ and repulsion for $N=1$.The attraction between critical points that occurs when the dimension is greater than two is due to critic...
We present the results of systematic numerical computations relating to the extreme value statistics...
We present the results of systematic numerical computations relating to the extreme value statistics...
Our goal is to discuss in detail the calculation of the mean num-ber of stationary points and minima...
International audienceLet X = {X(t) : t is an element of R-N} be an isotropic Gaussian random field ...
International audienceLet X = {X(t) : t is an element of R-N} be an isotropic Gaussian random field ...
International audienceLet X = {X(t) : t is an element of R-N} be an isotropic Gaussian random field ...
Let X = {X(t) : t ∈ R N } be an isotropic Gaussian random field with real values. In a first part we...
We obtain formulae for the expected number and height distribution of critical points of smooth isot...
We study the behaviour of the point process of critical points of isotropic stationary Gaussian fiel...
The high peaks of a Gaussian random field are studied. Asymptotic expansions, appropriate for high p...
The high peaks of a Gaussian random field are studied. Asymptotic expansions, appropriate for high p...
The high peaks of a Gaussian random field are studied. Asymptotic expansions, appropriate for high p...
Abstract. Correlation functions involving products and ratios of half-integer powers of characterist...
We study the behaviour of the point process of critical points of isotropic stationary Gaussian fie...
In this paper we examine isotropic Gaussian random fields defined on $\mathbb R^N$ satisfying certai...
We present the results of systematic numerical computations relating to the extreme value statistics...
We present the results of systematic numerical computations relating to the extreme value statistics...
Our goal is to discuss in detail the calculation of the mean num-ber of stationary points and minima...
International audienceLet X = {X(t) : t is an element of R-N} be an isotropic Gaussian random field ...
International audienceLet X = {X(t) : t is an element of R-N} be an isotropic Gaussian random field ...
International audienceLet X = {X(t) : t is an element of R-N} be an isotropic Gaussian random field ...
Let X = {X(t) : t ∈ R N } be an isotropic Gaussian random field with real values. In a first part we...
We obtain formulae for the expected number and height distribution of critical points of smooth isot...
We study the behaviour of the point process of critical points of isotropic stationary Gaussian fiel...
The high peaks of a Gaussian random field are studied. Asymptotic expansions, appropriate for high p...
The high peaks of a Gaussian random field are studied. Asymptotic expansions, appropriate for high p...
The high peaks of a Gaussian random field are studied. Asymptotic expansions, appropriate for high p...
Abstract. Correlation functions involving products and ratios of half-integer powers of characterist...
We study the behaviour of the point process of critical points of isotropic stationary Gaussian fie...
In this paper we examine isotropic Gaussian random fields defined on $\mathbb R^N$ satisfying certai...
We present the results of systematic numerical computations relating to the extreme value statistics...
We present the results of systematic numerical computations relating to the extreme value statistics...
Our goal is to discuss in detail the calculation of the mean num-ber of stationary points and minima...
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