AbstractWe present a functional limit theorem for the empirical level-crossing behaviour of a stationary Gaussian process. This leads to the well-known Slepian model process for a Gaussian process after an upcrossing of a prescribed level as a weak limit in C-space for an empirically defined finite set of functions.We also stress the importance of choosing a suitable topology by giving some natural examples of continuous and non-continuous functionals
A Slepian model for the local behaviour near the level upcrossings of a chi²-process with dependent ...
The problem of (pathwise) large deviations for conditionally continuous Gaussian processes is invest...
AbstractTheorems of approximation of Gaussian processes for the sequential empirical process of the ...
We present a functional limit theorem for the empirical level-crossing behaviour of a stationary Gau...
AbstractWe present a functional limit theorem for the empirical level-crossing behaviour of a statio...
AbstractThe asymptotics for the number of times the empirical distribution function crosses the true...
http://www.i-journals.org/ps/viewarticle.php?id=73&layout=abstractInternational audienceThis paper p...
In crossing theory for stochastic processes the distribution of quantities such as distances between...
International audienceGiven an observation of the uniform empirical process alpha(n) its functional ...
We consider a real valued function of a vector valued, differentiable, stationary Gaussian process a...
Let F and G be two continuous distribution functions that cross at a finite number of points − ∞ ≤ t...
International audienceWe introduce a general method, which combines the one developed by the authors...
Under an appropriate regular variation condition, the affinely normalized partial sums of a sequence...
AbstractA model process is obtained for the behaviour of a non-differentiable but continuous station...
International audienceWe consider regularizations by convolution of the empirical process and study ...
A Slepian model for the local behaviour near the level upcrossings of a chi²-process with dependent ...
The problem of (pathwise) large deviations for conditionally continuous Gaussian processes is invest...
AbstractTheorems of approximation of Gaussian processes for the sequential empirical process of the ...
We present a functional limit theorem for the empirical level-crossing behaviour of a stationary Gau...
AbstractWe present a functional limit theorem for the empirical level-crossing behaviour of a statio...
AbstractThe asymptotics for the number of times the empirical distribution function crosses the true...
http://www.i-journals.org/ps/viewarticle.php?id=73&layout=abstractInternational audienceThis paper p...
In crossing theory for stochastic processes the distribution of quantities such as distances between...
International audienceGiven an observation of the uniform empirical process alpha(n) its functional ...
We consider a real valued function of a vector valued, differentiable, stationary Gaussian process a...
Let F and G be two continuous distribution functions that cross at a finite number of points − ∞ ≤ t...
International audienceWe introduce a general method, which combines the one developed by the authors...
Under an appropriate regular variation condition, the affinely normalized partial sums of a sequence...
AbstractA model process is obtained for the behaviour of a non-differentiable but continuous station...
International audienceWe consider regularizations by convolution of the empirical process and study ...
A Slepian model for the local behaviour near the level upcrossings of a chi²-process with dependent ...
The problem of (pathwise) large deviations for conditionally continuous Gaussian processes is invest...
AbstractTheorems of approximation of Gaussian processes for the sequential empirical process of the ...