International audienceThe Maximum Likelihood (ML) and Cross Validation (CV) methods for estimating covariance hyper-parameters are compared, in the context of Kriging with a misspecified covariance structure. A two-step approach is used. First, the case of the estimation of a single variance hyper-parameter is addressed, for which the fixed correlation function is misspecified. A predictive variance based quality criterion is introduced and a closed-form expression of this criterion is derived. It is shown that when the correlation function is misspecified, the CV does better compared to ML, while ML is optimal when the model is well-specified. In the second step, the results of the first step are extended to the case when the hyper-paramet...
This article revisits the fundamental problem of parameter selection for Gaussian process interpolat...
International audienceThis paper deals with a theoretical approach to assessing the effects of param...
Probabilistic regression models typically use the Maximum Likelihood Estimation or Cross-Validation ...
International audienceThe Maximum Likelihood (ML) and Cross Validation (CV) methods for estimating c...
The Maximum Likelihood (ML) and Cross Validation (CV) methods for esti-mating covariance hyper-param...
The parametric estimation of the covariance function of a Gaussian process is studied, in the framew...
International audienceIn parametric estimation of covariance function of Gaussian processes, it is o...
International audienceIn many situations physical systems may be known to satisfy inequality constra...
We generalize fast Gaussian process leave-one-out formulae to multiple-fold cross-validation, highli...
L'estimation paramétrique de la fonction de covariance d'un processus Gaussien est étudiée, dans le ...
Gaussian processes are powerful regression models specified by parameterized mean and covariance fun...
AbstractIn many situations physical systems may be known to satisfy inequality constraints with resp...
International audienceWe consider a one-dimensional Gaussian process having exponential covariance f...
Gaussian Processes are powerful regression models specified by parametrized mean and covariance func...
This work is on Gaussian-process based approximation of a code which can be run at different levels ...
This article revisits the fundamental problem of parameter selection for Gaussian process interpolat...
International audienceThis paper deals with a theoretical approach to assessing the effects of param...
Probabilistic regression models typically use the Maximum Likelihood Estimation or Cross-Validation ...
International audienceThe Maximum Likelihood (ML) and Cross Validation (CV) methods for estimating c...
The Maximum Likelihood (ML) and Cross Validation (CV) methods for esti-mating covariance hyper-param...
The parametric estimation of the covariance function of a Gaussian process is studied, in the framew...
International audienceIn parametric estimation of covariance function of Gaussian processes, it is o...
International audienceIn many situations physical systems may be known to satisfy inequality constra...
We generalize fast Gaussian process leave-one-out formulae to multiple-fold cross-validation, highli...
L'estimation paramétrique de la fonction de covariance d'un processus Gaussien est étudiée, dans le ...
Gaussian processes are powerful regression models specified by parameterized mean and covariance fun...
AbstractIn many situations physical systems may be known to satisfy inequality constraints with resp...
International audienceWe consider a one-dimensional Gaussian process having exponential covariance f...
Gaussian Processes are powerful regression models specified by parametrized mean and covariance func...
This work is on Gaussian-process based approximation of a code which can be run at different levels ...
This article revisits the fundamental problem of parameter selection for Gaussian process interpolat...
International audienceThis paper deals with a theoretical approach to assessing the effects of param...
Probabilistic regression models typically use the Maximum Likelihood Estimation or Cross-Validation ...