This paper studies polar sets of anisotropic Gaussian random fields, i.e. sets which a Gaussian random field does not hit almost surely. The main assumptions are that the eigenvalues of the covariance matrix are bounded from below and that the canonical metric associated with the Gaussian random field is dominated by an anisotropic metric. We deduce an upper bound for the hitting probabilities and conclude that sets with small Hausdorff dimension are polar. Moreover, the results allow for a translation of the Gaussian random field by a random field, that is independent of the Gaussian random field and whose sample functions are of bounded Hölder norm
This paper is concerned with the properties of Gaussian random fields defined on a riemannian homoge...
Sensitivity of output of a linear operator to its input can be quantified in various ways. In Contro...
Let $d$ be an integer greater or equal to 2 and let $\mathbf k$ be a $d$-dimensional random vector. ...
This paper studies polar sets for anisotropic Gaussian random fields, i.e. sets which a Gaussian ran...
This paper studies polar sets of anisotropic Gaussian random fields, i.e. sets which a Gaussian rand...
Let X = {X(t), t ∈ RN} be a Gaussian random field with values in Rd defined by X(t) = X1(t),..., Xd(...
Anisotropic Gaussian random fields arise in probability theory and in various applications. Typical ...
Special Issue: Proceedings of the "XIème Colloque Franco-Roumain de Mathématiques Appliquées"Interna...
We obtain formulae for the expected number and height distribution of critical points of smooth isot...
We study the sample paths properties of Operator scaling Gaussian random fields. Such fields are ani...
Gaussian random fields defined over compact two-point homogeneous spaces are considered and Sobolev ...
Sensitivity of output of a linear operator to its input can be quantified in various ways. In Contro...
International audienceThe characterization and estimation of the Hölder regularity of random fields ...
We develop criteria for hitting probabilities of anisotropic Gaussian random fields with associated ...
International audienceWe propose an explicit way to generate a large class of Operator scaling Gauss...
This paper is concerned with the properties of Gaussian random fields defined on a riemannian homoge...
Sensitivity of output of a linear operator to its input can be quantified in various ways. In Contro...
Let $d$ be an integer greater or equal to 2 and let $\mathbf k$ be a $d$-dimensional random vector. ...
This paper studies polar sets for anisotropic Gaussian random fields, i.e. sets which a Gaussian ran...
This paper studies polar sets of anisotropic Gaussian random fields, i.e. sets which a Gaussian rand...
Let X = {X(t), t ∈ RN} be a Gaussian random field with values in Rd defined by X(t) = X1(t),..., Xd(...
Anisotropic Gaussian random fields arise in probability theory and in various applications. Typical ...
Special Issue: Proceedings of the "XIème Colloque Franco-Roumain de Mathématiques Appliquées"Interna...
We obtain formulae for the expected number and height distribution of critical points of smooth isot...
We study the sample paths properties of Operator scaling Gaussian random fields. Such fields are ani...
Gaussian random fields defined over compact two-point homogeneous spaces are considered and Sobolev ...
Sensitivity of output of a linear operator to its input can be quantified in various ways. In Contro...
International audienceThe characterization and estimation of the Hölder regularity of random fields ...
We develop criteria for hitting probabilities of anisotropic Gaussian random fields with associated ...
International audienceWe propose an explicit way to generate a large class of Operator scaling Gauss...
This paper is concerned with the properties of Gaussian random fields defined on a riemannian homoge...
Sensitivity of output of a linear operator to its input can be quantified in various ways. In Contro...
Let $d$ be an integer greater or equal to 2 and let $\mathbf k$ be a $d$-dimensional random vector. ...